Period sequence 0
First 10 period coefficients: [1, 0, 12, 0, 540, 0, 33600, 0, 2425500, 0]
The PF operator has N=3, r=2
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(231, 518837, 'not terminal', 1)
(741, 547501, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
108*t^2*D^3 + 324*t^2*D^2 + 312*t^2*D - D^3 + 96*t^2
================================================================================
Period sequence 1
First 10 period coefficients: [1, 0, 24, 0, 2520, 0, 369600, 0, 63063000, 0]
The PF operator has N=3, r=2
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(427, 547520, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
256*t^2*D^3 + 768*t^2*D^2 + 704*t^2*D - D^3 + 192*t^2
================================================================================
Period sequence 2
First 10 period coefficients: [1, 0, 8, 0, 216, 0, 8000, 0, 343000, 0]
The PF operator has N=3, r=2
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(8, 547367, 'not terminal', 1)
(91, 544065, 'not terminal', 1)
(119, 519672, 'not terminal', 1)
(153, 430103, 'not terminal', 1)
(197, 255744, 'terminal', 1)
(428, 547516, 'not terminal', 1)
(432, 547285, 'not terminal', 1)
(433, 547298, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
64*t^2*D^3 + 192*t^2*D^2 + 192*t^2*D - D^3 + 64*t^2
================================================================================
Period sequence 3
First 10 period coefficients: [1, 0, 12, 48, 540, 4320, 42240, 403200, 4038300, 40958400]
The PF operator has N=3, r=3
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(488, 543412, 'not terminal', 2)
(577, 516786, 'not terminal', 2)
(609, 425459, 'not terminal', 2)
(1190, 507649, 'not terminal', 1)
(1275, 413301, 'not terminal', 1)
(1460, 250869, 'not terminal', 2)
(1502, 674139, 'not terminal', 3)
(1529, 12645, 'terminal', 4)
(1774, 408626, 'not terminal', 3)
(1986, 534504, 'not terminal', 1)
(1990, 534507, 'not terminal', 1)
(2022, 491583, 'not terminal', 1)
(2040, 491586, 'not terminal', 1)
(2152, 387007, 'not terminal', 1)
(2200, 222775, 'not terminal', 2)
(2257, 234713, 'not terminal', 2)
(2337, 61130, 'not terminal', 2)
(2347, 60878, 'not terminal', 2)
(2354, 1517, 'not terminal', 2)
(2618, 204551, 'not terminal', 1)
(2809, 468913, 'not terminal', 2)
(2960, 195976, 'not terminal', 2)
(3006, 646162, 'not terminal', 2)
(3118, 463650, 'not terminal', 1)
(3256, 160162, 'not terminal', 1)
(3489, 135822, 'not terminal', 1)
(3813, 290693, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
The PF operator for this sequence is:
192*t^3*D^3 + 864*t^3*D^2 + 80*t^2*D^3 + 1248*t^3*D + 240*t^2*D^2 + 4*t*D^3 + 576*t^3 + 256*t^2*D + 6*t*D^2 - D^3 + 96*t^2 + 2*t*D
================================================================================
Period sequence 4
First 10 period coefficients: [1, 0, 0, 12, 0, 0, 540, 0, 0, 33600]
The PF operator has N=3, r=3
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1, 547378, 'not terminal', 1)
(3, 544395, 'terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
108*t^3*D^3 + 486*t^3*D^2 + 702*t^3*D + 324*t^3 - D^3
================================================================================
Period sequence 5
First 10 period coefficients: [1, 0, 152, 3840, 157656, 6428160, 280064960, 12618762240, 584579486680, 27660007173120]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(3313, 547429, 'not terminal', 1)
(4004, 522681, 'not terminal', 1)
(4166, 264812, 'not terminal', 1)
(4193, 521215, 'not terminal', 1)
(4202, 433519, 'not terminal', 1)
(4204, 433517, 'not terminal', 1)
(4216, 261645, 'not terminal', 1)
(4230, 544534, 'not terminal', 1)
(4237, 520915, 'not terminal', 1)
(4243, 432471, 'not terminal', 1)
(4249, 259467, 'not terminal', 1)
(4250, 259468, 'not terminal', 1)
(4266, 258004, 'not terminal', 1)
(4268, 258029, 'not terminal', 1)
(4274, 520538, 'not terminal', 1)
(4279, 257048, 'not terminal', 1)
(4289, 431045, 'not terminal', 1)
(4297, 520329, 'not terminal', 1)
(4298, 520332, 'not terminal', 1)
(4303, 520261, 'not terminal', 1)
(4312, 547389, 'not terminal', 1)
(4313, 544405, 'not terminal', 1)
(4314, 544406, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
28672*t^4*D^3 + 172032*t^4*D^2 + 10240*t^3*D^3 + 315392*t^4*D + 46080*t^3*D^2 + 1152*t^2*D^3 + 172032*t^4 + 66560*t^3*D + 3456*t^2*D^2 + 32*t*D^3 + 30720*t^3 + 3520*t^2*D + 48*t*D^2 - D^3 + 1216*t^2 + 16*t*D
================================================================================
Period sequence 6
First 10 period coefficients: [1, 0, 4, 0, 60, 0, 1120, 0, 24220, 0]
The PF operator has N=3, r=4
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(12, 544356, 'not terminal', 1)
(21, 520158, 'terminal', 2)
(103, 544063, 'not terminal', 1)
(121, 519664, 'not terminal', 1)
(155, 430096, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
128*t^4*D^3 + 768*t^4*D^2 + 1408*t^4*D + 28*t^2*D^3 + 768*t^4 + 84*t^2*D^2 + 88*t^2*D - D^3 + 32*t^2
================================================================================
Period sequence 7
First 10 period coefficients: [1, 0, 48, 600, 13176, 276480, 6259800, 146064240, 3505282200, 85882130880]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2755, 474429, 'not terminal', 1)
(2816, 355616, 'not terminal', 1)
(2816, 355616, 'not terminal', 1)
(3405, 321303, 'not terminal', 1)
(3446, 147470, 'not terminal', 1)
(3446, 147470, 'not terminal', 1)
(3451, 147467, 'not terminal', 1)
(3504, 610803, 'not terminal', 1)
(3504, 610803, 'not terminal', 1)
(3624, 305807, 'not terminal', 1)
(3625, 306072, 'not terminal', 1)
(3666, 129112, 'not terminal', 1)
(3682, 127896, 'not terminal', 1)
(3701, 597737, 'not terminal', 1)
(3730, 544886, 'not terminal', 1)
(3761, 446913, 'not terminal', 1)
(3790, 294031, 'not terminal', 1)
(3790, 294031, 'not terminal', 1)
(3794, 292940, 'not terminal', 1)
(3795, 292458, 'not terminal', 1)
(3843, 585895, 'not terminal', 1)
(3843, 585895, 'not terminal', 1)
(3844, 585890, 'not terminal', 1)
(3844, 585890, 'not terminal', 1)
(3845, 585897, 'not terminal', 1)
(3845, 585897, 'not terminal', 1)
(3847, 585514, 'not terminal', 1)
(3852, 585548, 'not terminal', 1)
(3856, 585686, 'not terminal', 1)
(3867, 29624, 'not terminal', 1)
(3867, 29624, 'not terminal', 1)
(3868, 29628, 'not terminal', 1)
(3873, 5953, 'not terminal', 1)
(3873, 5953, 'not terminal', 1)
(3874, 5954, 'not terminal', 1)
(3874, 5954, 'not terminal', 1)
(3932, 281846, 'not terminal', 1)
(3935, 281906, 'not terminal', 1)
(3936, 281910, 'not terminal', 1)
(3937, 282088, 'not terminal', 1)
(3945, 281909, 'not terminal', 1)
(3961, 98314, 'not terminal', 1)
(3965, 93823, 'not terminal', 1)
(3966, 95245, 'not terminal', 1)
(3980, 574886, 'not terminal', 1)
(3982, 573895, 'not terminal', 1)
(3983, 574977, 'not terminal', 1)
(3984, 574842, 'not terminal', 1)
(3990, 25067, 'not terminal', 1)
(4026, 439663, 'not terminal', 1)
(4042, 274128, 'not terminal', 1)
(4057, 87167, 'not terminal', 1)
(4057, 87167, 'not terminal', 1)
(4058, 86668, 'not terminal', 1)
(4059, 86880, 'not terminal', 1)
(4069, 83883, 'not terminal', 1)
(4074, 566716, 'not terminal', 1)
(4074, 566716, 'not terminal', 1)
(4075, 566695, 'not terminal', 1)
(4075, 566695, 'not terminal', 1)
(4079, 21153, 'not terminal', 1)
(4101, 437078, 'not terminal', 1)
(4103, 436976, 'not terminal', 1)
(4118, 268997, 'not terminal', 1)
(4121, 268912, 'not terminal', 1)
(4123, 268019, 'not terminal', 1)
(4132, 78482, 'not terminal', 1)
(4133, 78269, 'not terminal', 1)
(4143, 558361, 'not terminal', 1)
(4144, 558688, 'not terminal', 1)
(4148, 521504, 'not terminal', 1)
(4168, 264855, 'not terminal', 1)
(4168, 264855, 'not terminal', 1)
(4169, 263867, 'not terminal', 1)
(4178, 72123, 'not terminal', 1)
(4179, 72493, 'not terminal', 1)
(4181, 72684, 'not terminal', 1)
(4181, 72684, 'not terminal', 1)
(4182, 72202, 'not terminal', 1)
(4182, 72202, 'not terminal', 1)
(4183, 72680, 'not terminal', 1)
(4217, 261497, 'not terminal', 1)
(4219, 260624, 'not terminal', 1)
(4240, 520890, 'not terminal', 1)
(4246, 432558, 'not terminal', 1)
(4248, 432464, 'not terminal', 1)
(4253, 259203, 'not terminal', 1)
(4262, 431807, 'not terminal', 1)
(4269, 257760, 'not terminal', 1)
(4271, 257945, 'not terminal', 1)
(4272, 257862, 'not terminal', 1)
(4292, 431027, 'not terminal', 1)
(4293, 430976, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
3600*t^4*D^3 + 21600*t^4*D^2 + 2040*t^3*D^3 + 39600*t^4*D + 9180*t^3*D^2 + 359*t^2*D^3 + 21600*t^4 + 13260*t^3*D + 1077*t^2*D^2 + 14*t*D^3 + 6120*t^3 + 1102*t^2*D + 21*t*D^2 - D^3 + 384*t^2 + 7*t*D
================================================================================
Period sequence 8
First 10 period coefficients: [1, 0, 8, 24, 240, 1440, 11960, 89040, 731920, 5913600]
The PF operator has N=3, r=4
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(122, 519649, 'not terminal', 2)
(237, 518830, 'not terminal', 1)
(294, 429082, 'not terminal', 1)
(463, 543553, 'not terminal', 1)
(512, 516974, 'not terminal', 1)
(625, 425410, 'not terminal', 2)
(699, 61968, 'not terminal', 2)
(702, 61981, 'not terminal', 2)
(730, 674688, 'terminal', 2)
(732, 674685, 'terminal', 2)
(828, 513257, 'not terminal', 1)
(909, 420832, 'not terminal', 1)
(917, 420911, 'not terminal', 1)
(963, 419969, 'not terminal', 2)
(1094, 674577, 'not terminal', 2)
(1095, 674598, 'not terminal', 2)
(1101, 674607, 'not terminal', 2)
(1102, 674578, 'not terminal', 2)
(1110, 61963, 'terminal', 2)
(1119, 546609, 'not terminal', 1)
(1132, 539540, 'not terminal', 1)
(1133, 539453, 'not terminal', 1)
(1146, 539478, 'not terminal', 1)
(1183, 507651, 'not terminal', 1)
(1187, 507587, 'not terminal', 1)
(1189, 507636, 'not terminal', 1)
(1227, 506691, 'not terminal', 2)
(1360, 412197, 'not terminal', 2)
(1374, 412119, 'not terminal', 2)
(1388, 246297, 'not terminal', 1)
(1399, 246050, 'not terminal', 2)
(1404, 246108, 'not terminal', 1)
(1435, 251552, 'not terminal', 2)
(1445, 251086, 'not terminal', 2)
(1509, 674087, 'not terminal', 2)
(1517, 61936, 'not terminal', 2)
(1653, 498796, 'not terminal', 2)
(1705, 402373, 'not terminal', 1)
(1722, 402266, 'not terminal', 1)
(1752, 397711, 'not terminal', 2)
(1846, 236262, 'not terminal', 1)
(1872, 669437, 'not terminal', 1)
(1892, 672913, 'not terminal', 1)
(1893, 672826, 'not terminal', 1)
(1914, 671908, 'not terminal', 2)
(1919, 671936, 'not terminal', 2)
(1934, 61770, 'not terminal', 1)
(2038, 491281, 'not terminal', 1)
(2066, 486941, 'not terminal', 2)
(2086, 388962, 'not terminal', 1)
(2105, 388129, 'not terminal', 1)
(2143, 388557, 'not terminal', 1)
(2146, 388498, 'not terminal', 1)
(2164, 385229, 'not terminal', 2)
(2193, 223127, 'not terminal', 1)
(2244, 222612, 'not terminal', 1)
(2253, 231089, 'not terminal', 2)
(2319, 669046, 'not terminal', 1)
(2333, 61316, 'not terminal', 1)
(2414, 482045, 'not terminal', 1)
(2431, 482353, 'not terminal', 1)
(2490, 371033, 'not terminal', 1)
(2521, 370589, 'not terminal', 1)
(2531, 370638, 'not terminal', 1)
(2598, 204086, 'not terminal', 1)
(2674, 662260, 'not terminal', 1)
(2728, 529927, 'not terminal', 1)
(2729, 529925, 'not terminal', 1)
(2783, 473103, 'not terminal', 1)
(2784, 473149, 'not terminal', 1)
(2867, 353915, 'not terminal', 1)
(2870, 353914, 'not terminal', 1)
(2873, 352836, 'not terminal', 1)
(2948, 181701, 'not terminal', 1)
(2955, 181632, 'not terminal', 1)
(3002, 649478, 'not terminal', 1)
(3005, 649168, 'not terminal', 1)
(3116, 464073, 'not terminal', 1)
(3180, 332292, 'not terminal', 1)
(3192, 334858, 'not terminal', 1)
(3339, 526756, 'not terminal', 1)
(3383, 456760, 'not terminal', 1)
(3428, 314752, 'not terminal', 1)
(3609, 451932, 'not terminal', 1)
(3611, 450146, 'not terminal', 1)
(3658, 303278, 'not terminal', 1)
(3746, 524263, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
80*t^4*D^3 + 480*t^4*D^2 + 136*t^3*D^3 + 880*t^4*D + 612*t^3*D^2 + 59*t^2*D^3 + 480*t^4 + 884*t^3*D + 177*t^2*D^2 + 2*t*D^3 + 408*t^3 + 182*t^2*D + 3*t*D^2 - D^3 + 64*t^2 + t*D
================================================================================
Period sequence 9
First 10 period coefficients: [1, 0, 78, 1320, 37746, 1051920, 31464780, 971757360, 30859805970, 1000739433120]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(3050, 528558, 'not terminal', 1)
(3791, 294041, 'not terminal', 1)
(3902, 442714, 'not terminal', 1)
(3921, 283511, 'not terminal', 1)
(3926, 283519, 'not terminal', 1)
(3927, 282264, 'not terminal', 1)
(3963, 98325, 'not terminal', 1)
(3964, 98326, 'not terminal', 1)
(4006, 522324, 'not terminal', 1)
(4022, 439394, 'not terminal', 1)
(4023, 439399, 'not terminal', 1)
(4031, 438025, 'not terminal', 1)
(4041, 275510, 'not terminal', 1)
(4043, 274167, 'not terminal', 1)
(4055, 86711, 'not terminal', 1)
(4073, 566718, 'not terminal', 1)
(4117, 269340, 'not terminal', 1)
(4130, 78248, 'not terminal', 1)
(4131, 78175, 'not terminal', 1)
(4134, 78330, 'not terminal', 1)
(4142, 560035, 'not terminal', 1)
(4160, 435180, 'not terminal', 1)
(4167, 264850, 'not terminal', 1)
(4180, 72114, 'not terminal', 1)
(4185, 555254, 'not terminal', 1)
(4189, 521210, 'not terminal', 1)
(4190, 521212, 'not terminal', 1)
(4199, 433689, 'not terminal', 1)
(4201, 433642, 'not terminal', 1)
(4205, 433633, 'not terminal', 1)
(4213, 261697, 'not terminal', 1)
(4215, 261648, 'not terminal', 1)
(4218, 260631, 'not terminal', 1)
(4224, 68371, 'not terminal', 1)
(4227, 551994, 'not terminal', 1)
(4244, 432671, 'not terminal', 1)
(4251, 259464, 'not terminal', 1)
(4254, 65832, 'not terminal', 1)
(4257, 520706, 'not terminal', 1)
(4260, 431891, 'not terminal', 1)
(4267, 258031, 'not terminal', 1)
(4280, 257095, 'not terminal', 1)
(4290, 431005, 'not terminal', 1)
(4291, 431051, 'not terminal', 1)
(4294, 544439, 'not terminal', 1)
(4300, 520319, 'not terminal', 1)
(4302, 430778, 'not terminal', 1)
(4306, 430676, 'not terminal', 1)
(4310, 520191, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
8784*t^4*D^3 + 52704*t^4*D^2 + 4080*t^3*D^3 + 96624*t^4*D + 18360*t^3*D^2 + 592*t^2*D^3 + 52704*t^4 + 26520*t^3*D + 1776*t^2*D^2 + 20*t*D^3 + 12240*t^3 + 1808*t^2*D + 30*t*D^2 - D^3 + 624*t^2 + 10*t*D
================================================================================
Period sequence 10
First 10 period coefficients: [1, 0, 18, 120, 1566, 18360, 237060, 3129840, 42576030, 590756880]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1558, 537117, 'not terminal', 1)
(1591, 500518, 'not terminal', 1)
(1615, 500364, 'not terminal', 1)
(1694, 402564, 'not terminal', 1)
(1783, 236732, 'not terminal', 1)
(1791, 236722, 'not terminal', 1)
(1826, 236600, 'not terminal', 1)
(2048, 491706, 'not terminal', 1)
(2107, 387279, 'not terminal', 1)
(2115, 388505, 'not terminal', 1)
(2186, 223100, 'not terminal', 1)
(2187, 223102, 'not terminal', 1)
(2188, 223154, 'not terminal', 1)
(2222, 222475, 'not terminal', 1)
(2270, 662848, 'not terminal', 1)
(2288, 662834, 'not terminal', 1)
(2301, 662832, 'not terminal', 1)
(2336, 61365, 'not terminal', 1)
(2468, 372892, 'not terminal', 1)
(2479, 370754, 'not terminal', 1)
(2493, 370852, 'not terminal', 1)
(2499, 370782, 'not terminal', 1)
(2519, 372147, 'not terminal', 1)
(2538, 372148, 'not terminal', 1)
(2564, 205912, 'not terminal', 1)
(2570, 205938, 'not terminal', 1)
(2577, 205973, 'not terminal', 1)
(2594, 204885, 'not terminal', 1)
(2604, 204865, 'not terminal', 1)
(2632, 652803, 'not terminal', 1)
(2645, 652691, 'not terminal', 1)
(2647, 652669, 'not terminal', 1)
(2657, 662250, 'not terminal', 1)
(2679, 57386, 'not terminal', 1)
(2682, 60038, 'not terminal', 1)
(2683, 60041, 'not terminal', 1)
(2690, 59974, 'not terminal', 1)
(2698, 12465, 'not terminal', 1)
(2700, 12510, 'not terminal', 1)
(2702, 1515, 'not terminal', 1)
(2762, 473300, 'not terminal', 1)
(2831, 355341, 'not terminal', 1)
(2839, 353935, 'not terminal', 1)
(2846, 353942, 'not terminal', 1)
(2857, 352810, 'not terminal', 1)
(2897, 186448, 'not terminal', 1)
(2901, 186252, 'not terminal', 1)
(2910, 186253, 'not terminal', 1)
(2920, 186479, 'not terminal', 1)
(2922, 186663, 'not terminal', 1)
(2962, 639854, 'not terminal', 1)
(2979, 639732, 'not terminal', 1)
(2981, 639027, 'not terminal', 1)
(2984, 639695, 'not terminal', 1)
(2988, 639710, 'not terminal', 1)
(3010, 53085, 'not terminal', 1)
(3014, 57336, 'not terminal', 1)
(3019, 57256, 'not terminal', 1)
(3022, 57226, 'not terminal', 1)
(3023, 57290, 'not terminal', 1)
(3024, 57272, 'not terminal', 1)
(3034, 12193, 'not terminal', 1)
(3036, 12161, 'not terminal', 1)
(3037, 1505, 'not terminal', 1)
(3054, 528551, 'not terminal', 1)
(3060, 527955, 'not terminal', 1)
(3098, 464419, 'not terminal', 1)
(3143, 338018, 'not terminal', 1)
(3150, 338244, 'not terminal', 1)
(3154, 335142, 'not terminal', 1)
(3159, 333359, 'not terminal', 1)
(3160, 335731, 'not terminal', 1)
(3179, 335733, 'not terminal', 1)
(3220, 165806, 'not terminal', 1)
(3225, 165835, 'not terminal', 1)
(3229, 165869, 'not terminal', 1)
(3232, 161596, 'not terminal', 1)
(3234, 163370, 'not terminal', 1)
(3236, 161572, 'not terminal', 1)
(3268, 624171, 'not terminal', 1)
(3273, 624115, 'not terminal', 1)
(3275, 624073, 'not terminal', 1)
(3277, 624451, 'not terminal', 1)
(3278, 624132, 'not terminal', 1)
(3280, 624343, 'not terminal', 1)
(3286, 637790, 'not terminal', 1)
(3289, 635469, 'not terminal', 1)
(3290, 630597, 'not terminal', 1)
(3292, 47445, 'not terminal', 1)
(3296, 47429, 'not terminal', 1)
(3298, 52838, 'not terminal', 1)
(3304, 52997, 'not terminal', 1)
(3306, 11567, 'not terminal', 1)
(3307, 11568, 'not terminal', 1)
(3360, 456303, 'not terminal', 1)
(3393, 320569, 'not terminal', 1)
(3394, 320563, 'not terminal', 1)
(3414, 314193, 'not terminal', 1)
(3422, 317467, 'not terminal', 1)
(3455, 144137, 'not terminal', 1)
(3456, 146567, 'not terminal', 1)
(3462, 146358, 'not terminal', 1)
(3465, 146307, 'not terminal', 1)
(3469, 146566, 'not terminal', 1)
(3485, 140871, 'not terminal', 1)
(3495, 140548, 'not terminal', 1)
(3507, 610446, 'not terminal', 1)
(3513, 608684, 'not terminal', 1)
(3515, 608813, 'not terminal', 1)
(3516, 608627, 'not terminal', 1)
(3519, 610102, 'not terminal', 1)
(3521, 606825, 'not terminal', 1)
(3525, 610103, 'not terminal', 1)
(3533, 40829, 'not terminal', 1)
(3540, 45832, 'not terminal', 1)
(3544, 10527, 'not terminal', 1)
(3585, 450161, 'not terminal', 1)
(3587, 449907, 'not terminal', 1)
(3595, 450327, 'not terminal', 1)
(3602, 451427, 'not terminal', 1)
(3604, 450160, 'not terminal', 1)
(3626, 305770, 'not terminal', 1)
(3645, 300021, 'not terminal', 1)
(3670, 125848, 'not terminal', 1)
(3677, 125176, 'not terminal', 1)
(3678, 126080, 'not terminal', 1)
(3680, 126185, 'not terminal', 1)
(3681, 127686, 'not terminal', 1)
(3691, 120787, 'not terminal', 1)
(3692, 120954, 'not terminal', 1)
(3698, 597560, 'not terminal', 1)
(3706, 595148, 'not terminal', 1)
(3712, 592451, 'not terminal', 1)
(3713, 595151, 'not terminal', 1)
(3715, 595061, 'not terminal', 1)
(3716, 595051, 'not terminal', 1)
(3721, 37682, 'not terminal', 1)
(3722, 39241, 'not terminal', 1)
(3763, 446171, 'not terminal', 1)
(3767, 446903, 'not terminal', 1)
(3768, 445062, 'not terminal', 1)
(3769, 444829, 'not terminal', 1)
(3811, 287942, 'not terminal', 1)
(3822, 287241, 'not terminal', 1)
(3828, 108694, 'not terminal', 1)
(3830, 107924, 'not terminal', 1)
(3833, 108116, 'not terminal', 1)
(3838, 103584, 'not terminal', 1)
(3858, 579032, 'not terminal', 1)
(3861, 580364, 'not terminal', 1)
(3865, 580302, 'not terminal', 1)
(3911, 442307, 'not terminal', 1)
(3929, 283324, 'not terminal', 1)
(3939, 282905, 'not terminal', 1)
(3941, 282805, 'not terminal', 1)
(3950, 278148, 'not terminal', 1)
(3954, 281543, 'not terminal', 1)
(3957, 280321, 'not terminal', 1)
(3958, 277552, 'not terminal', 1)
(3968, 96299, 'not terminal', 1)
(3970, 96497, 'not terminal', 1)
(3978, 89065, 'not terminal', 1)
(3986, 568804, 'not terminal', 1)
(3987, 568869, 'not terminal', 1)
(4052, 272829, 'not terminal', 1)
(4067, 86200, 'not terminal', 1)
(4072, 82865, 'not terminal', 1)
(4084, 544685, 'not terminal', 1)
(4095, 521906, 'not terminal', 1)
(4109, 436777, 'not terminal', 1)
(4111, 436667, 'not terminal', 1)
(4113, 436698, 'not terminal', 1)
(4122, 268454, 'not terminal', 1)
(4129, 267792, 'not terminal', 1)
(4141, 77057, 'not terminal', 1)
(4173, 264169, 'not terminal', 1)
(4177, 262832, 'not terminal', 1)
(4241, 520868, 'not terminal', 1)
(4264, 431504, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
648*t^4*D^3 + 3888*t^4*D^2 + 540*t^3*D^3 + 7128*t^4*D + 2430*t^3*D^2 + 135*t^2*D^3 + 3888*t^4 + 3510*t^3*D + 405*t^2*D^2 + 6*t*D^3 + 1620*t^3 + 414*t^2*D + 9*t*D^2 - D^3 + 144*t^2 + 3*t*D
================================================================================
Period sequence 11
First 10 period coefficients: [1, 0, 44, 528, 11292, 228000, 4999040, 112654080, 2613620380, 61885803840]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2710, 530438, 'not terminal', 1)
(2816, 355616, 'not terminal', 1)
(3078, 466014, 'not terminal', 1)
(3318, 545139, 'not terminal', 1)
(3330, 526891, 'not terminal', 1)
(3348, 525745, 'not terminal', 2)
(3389, 321877, 'not terminal', 1)
(3415, 317924, 'not terminal', 2)
(3446, 147470, 'not terminal', 1)
(3504, 610803, 'not terminal', 1)
(3572, 452175, 'not terminal', 1)
(3619, 306960, 'not terminal', 1)
(3755, 446982, 'not terminal', 1)
(3759, 446933, 'not terminal', 1)
(3789, 294043, 'not terminal', 1)
(3790, 294031, 'not terminal', 1)
(3843, 585895, 'not terminal', 1)
(3844, 585890, 'not terminal', 1)
(3845, 585897, 'not terminal', 1)
(3856, 585686, 'not terminal', 1)
(3867, 29624, 'not terminal', 1)
(3873, 5953, 'not terminal', 1)
(3874, 5954, 'not terminal', 1)
(3900, 442762, 'not terminal', 1)
(3922, 283523, 'not terminal', 1)
(3932, 281846, 'not terminal', 1)
(3982, 573895, 'not terminal', 1)
(4002, 522683, 'not terminal', 1)
(4003, 522703, 'not terminal', 1)
(4040, 275527, 'not terminal', 1)
(4042, 274128, 'not terminal', 1)
(4057, 87167, 'not terminal', 1)
(4074, 566716, 'not terminal', 1)
(4075, 566695, 'not terminal', 1)
(4116, 269333, 'not terminal', 1)
(4158, 435216, 'not terminal', 1)
(4159, 434956, 'not terminal', 1)
(4168, 264855, 'not terminal', 1)
(4169, 263867, 'not terminal', 1)
(4181, 72684, 'not terminal', 1)
(4182, 72202, 'not terminal', 1)
(4214, 261714, 'not terminal', 1)
(4235, 544536, 'not terminal', 1)
(4240, 520890, 'not terminal', 1)
(4245, 432661, 'not terminal', 1)
(4248, 432464, 'not terminal', 1)
(4259, 431910, 'not terminal', 1)
(4277, 431397, 'not terminal', 1)
(4299, 520330, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
3584*t^4*D^3 + 21504*t^4*D^2 + 2112*t^3*D^3 + 39424*t^4*D + 9504*t^3*D^2 + 368*t^2*D^3 + 21504*t^4 + 13728*t^3*D + 1104*t^2*D^2 + 12*t*D^3 + 6336*t^3 + 1088*t^2*D + 18*t*D^2 - D^3 + 352*t^2 + 6*t*D
================================================================================
Period sequence 12
First 10 period coefficients: [1, 0, 0, 0, 24, 0, 0, 0, 2520, 0]
The PF operator has N=3, r=4
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(0, 547386, 'smooth', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
256*t^4*D^3 + 1536*t^4*D^2 + 2816*t^4*D + 1536*t^4 - D^3
================================================================================
Period sequence 13
First 10 period coefficients: [1, 0, 14, 72, 882, 8400, 95180, 1060080, 12389650, 146472480]
The PF operator has N=3, r=4
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1135, 539569, 'not terminal', 1)
(1193, 507586, 'not terminal', 1)
(1280, 413310, 'not terminal', 1)
(1347, 413085, 'not terminal', 1)
(1496, 674248, 'not terminal', 2)
(1545, 537133, 'not terminal', 1)
(1547, 537113, 'not terminal', 1)
(1583, 500497, 'not terminal', 1)
(1683, 402540, 'not terminal', 1)
(1821, 236574, 'not terminal', 1)
(1884, 672737, 'not terminal', 2)
(1887, 672861, 'not terminal', 1)
(2081, 388954, 'not terminal', 1)
(2091, 388966, 'not terminal', 1)
(2151, 388570, 'not terminal', 1)
(2224, 222624, 'not terminal', 1)
(2277, 662786, 'not terminal', 1)
(2278, 662796, 'not terminal', 1)
(2299, 662797, 'not terminal', 1)
(2310, 668983, 'not terminal', 2)
(2327, 61360, 'not terminal', 1)
(2349, 12608, 'not terminal', 2)
(2355, 10, 'terminal', 2)
(2411, 482428, 'not terminal', 1)
(2480, 372136, 'not terminal', 1)
(2539, 359406, 'not terminal', 2)
(2548, 206001, 'not terminal', 1)
(2579, 204760, 'not terminal', 2)
(2643, 652681, 'not terminal', 1)
(2653, 652715, 'not terminal', 1)
(2665, 662262, 'not terminal', 1)
(2681, 60032, 'not terminal', 1)
(2688, 60031, 'not terminal', 1)
(2697, 12519, 'not terminal', 1)
(2721, 529907, 'not terminal', 1)
(2742, 529800, 'not terminal', 1)
(2748, 474431, 'not terminal', 1)
(2761, 473110, 'not terminal', 1)
(2780, 473340, 'not terminal', 1)
(2819, 354967, 'not terminal', 1)
(2820, 355397, 'not terminal', 1)
(2889, 186748, 'not terminal', 1)
(2915, 186256, 'not terminal', 1)
(2954, 181697, 'not terminal', 1)
(2974, 639652, 'not terminal', 1)
(2975, 639467, 'not terminal', 1)
(2995, 649245, 'not terminal', 2)
(2999, 651604, 'not terminal', 1)
(3009, 53121, 'not terminal', 1)
(3028, 56368, 'not terminal', 2)
(3076, 465966, 'not terminal', 1)
(3089, 464399, 'not terminal', 1)
(3133, 338175, 'not terminal', 1)
(3134, 338158, 'not terminal', 1)
(3200, 166803, 'not terminal', 1)
(3253, 163000, 'not terminal', 1)
(3270, 623294, 'not terminal', 1)
(3302, 52267, 'not terminal', 1)
(3336, 526335, 'not terminal', 1)
(3354, 458626, 'not terminal', 1)
(3401, 321330, 'not terminal', 1)
(3420, 314336, 'not terminal', 1)
(3439, 315731, 'not terminal', 1)
(3477, 145166, 'not terminal', 1)
(3494, 134327, 'not terminal', 1)
(3500, 140258, 'not terminal', 1)
(3524, 608931, 'not terminal', 1)
(3539, 45839, 'not terminal', 1)
(3551, 525020, 'not terminal', 1)
(3590, 450075, 'not terminal', 1)
(3603, 450158, 'not terminal', 1)
(3633, 306075, 'not terminal', 1)
(3668, 125301, 'not terminal', 1)
(3704, 592333, 'not terminal', 1)
(3774, 446837, 'not terminal', 1)
(3805, 292773, 'not terminal', 1)
(3860, 580376, 'not terminal', 1)
(3892, 442983, 'not terminal', 1)
(3979, 91442, 'not terminal', 1)
(4014, 522631, 'not terminal', 1)
(4016, 522644, 'not terminal', 1)
(4027, 439692, 'not terminal', 1)
(4176, 262193, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
336*t^4*D^3 + 2016*t^4*D^2 + 368*t^3*D^3 + 3696*t^4*D + 1656*t^3*D^2 + 112*t^2*D^3 + 2016*t^4 + 2392*t^3*D + 336*t^2*D^2 + 4*t*D^3 + 1104*t^3 + 336*t^2*D + 6*t*D^2 - D^3 + 112*t^2 + 2*t*D
================================================================================
Period sequence 14
First 10 period coefficients: [1, 0, 6, 0, 114, 0, 2940, 0, 87570, 0]
The PF operator has N=3, r=4
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(42, 520063, 'not terminal', 1)
(67, 430442, 'terminal', 1)
(220, 543857, 'not terminal', 1)
(245, 518819, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
16*t^4*D^3 + 96*t^4*D^2 + 176*t^4*D + 44*t^2*D^3 + 96*t^4 + 132*t^2*D^2 + 136*t^2*D - D^3 + 48*t^2
================================================================================
Period sequence 15
First 10 period coefficients: [1, 0, 1944, 215808, 35295192, 5977566720, 1073491139520, 199954313717760, 38302652395770840, 7497487505353251840]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(4311, 547390, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
3207168*t^4*D^3 + 19243008*t^4*D^2 + 387072*t^3*D^3 + 35278848*t^4*D + 1741824*t^3*D^2 + 14976*t^2*D^3 + 19243008*t^4 + 2515968*t^3*D + 44928*t^2*D^2 + 160*t*D^3 + 1161216*t^3 + 45504*t^2*D + 240*t*D^2 - D^3 + 15552*t^2 + 80*t*D
================================================================================
Period sequence 16
First 10 period coefficients: [1, 0, 6, 24, 162, 1080, 7620, 55440, 415170, 3166800]
The PF operator has N=3, r=4
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(92, 544075, 'not terminal', 1)
(128, 519656, 'not terminal', 2)
(369, 254882, 'not terminal', 2)
(420, 62083, 'terminal', 3)
(555, 516755, 'not terminal', 2)
(635, 425353, 'not terminal', 2)
(736, 674673, 'terminal', 3)
(738, 674678, 'terminal', 3)
(756, 546977, 'not terminal', 1)
(776, 541681, 'not terminal', 1)
(801, 541398, 'not terminal', 2)
(830, 513201, 'not terminal', 1)
(973, 420086, 'not terminal', 2)
(976, 420478, 'not terminal', 2)
(981, 419971, 'not terminal', 2)
(1042, 253678, 'not terminal', 2)
(1062, 253974, 'not terminal', 2)
(1084, 674626, 'not terminal', 1)
(1104, 674529, 'not terminal', 3)
(1234, 506708, 'not terminal', 2)
(1295, 413098, 'not terminal', 1)
(1497, 673893, 'not terminal', 2)
(1507, 674094, 'not terminal', 2)
(1523, 61915, 'not terminal', 2)
(1764, 400494, 'not terminal', 2)
(1766, 400145, 'not terminal', 2)
(1767, 400227, 'not terminal', 2)
(1811, 236421, 'not terminal', 1)
(1851, 236231, 'not terminal', 1)
(1853, 236555, 'not terminal', 1)
(1858, 245022, 'not terminal', 2)
(1913, 672076, 'not terminal', 2)
(1933, 61769, 'not terminal', 1)
(2030, 490916, 'not terminal', 1)
(2175, 385001, 'not terminal', 2)
(2240, 221492, 'not terminal', 1)
(2321, 667186, 'not terminal', 2)
(2442, 481366, 'not terminal', 1)
(2450, 479732, 'not terminal', 2)
(2504, 370044, 'not terminal', 1)
(2528, 372132, 'not terminal', 1)
(2529, 371259, 'not terminal', 1)
(2610, 202555, 'not terminal', 1)
(2797, 472610, 'not terminal', 1)
(2882, 346002, 'not terminal', 2)
(3068, 527903, 'not terminal', 1)
(3176, 331526, 'not terminal', 1)
(3188, 332295, 'not terminal', 1)
(3440, 314609, 'not terminal', 1)
(3787, 446396, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
216*t^4*D^3 + 1296*t^4*D^2 + 156*t^3*D^3 + 2376*t^4*D + 702*t^3*D^2 + 43*t^2*D^3 + 1296*t^4 + 1014*t^3*D + 129*t^2*D^2 + 2*t*D^3 + 468*t^3 + 134*t^2*D + 3*t*D^2 - D^3 + 48*t^2 + t*D
================================================================================
Period sequence 17
First 10 period coefficients: [1, 0, 12, 60, 636, 5760, 58620, 604800, 6447420, 70022400]
The PF operator has N=3, r=4
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(838, 513271, 'not terminal', 1)
(929, 420909, 'not terminal', 1)
(1021, 251679, 'not terminal', 1)
(1027, 251680, 'not terminal', 1)
(1140, 539490, 'not terminal', 1)
(1271, 413299, 'not terminal', 1)
(1312, 413150, 'not terminal', 1)
(1427, 246241, 'not terminal', 1)
(1481, 674247, 'not terminal', 1)
(1483, 674241, 'not terminal', 1)
(1603, 500036, 'not terminal', 1)
(1699, 402281, 'not terminal', 1)
(1715, 402297, 'not terminal', 1)
(1721, 402434, 'not terminal', 1)
(1785, 236692, 'not terminal', 1)
(1815, 236477, 'not terminal', 1)
(1854, 236595, 'not terminal', 1)
(1879, 669463, 'not terminal', 1)
(1885, 672886, 'not terminal', 1)
(1886, 672906, 'not terminal', 1)
(1888, 672877, 'not terminal', 1)
(1897, 672700, 'not terminal', 1)
(1898, 672887, 'not terminal', 1)
(1900, 672881, 'not terminal', 1)
(1928, 61779, 'not terminal', 1)
(1929, 61780, 'not terminal', 1)
(1936, 61803, 'not terminal', 1)
(1941, 12639, 'not terminal', 1)
(1942, 125, 'terminal', 1)
(2114, 388599, 'not terminal', 1)
(2120, 387405, 'not terminal', 1)
(2180, 223147, 'not terminal', 1)
(2211, 222629, 'not terminal', 1)
(2213, 222761, 'not terminal', 1)
(2227, 222574, 'not terminal', 1)
(2228, 222533, 'not terminal', 1)
(2234, 222478, 'not terminal', 1)
(2247, 222531, 'not terminal', 1)
(2272, 662846, 'not terminal', 1)
(2273, 662772, 'not terminal', 1)
(2283, 662809, 'not terminal', 1)
(2287, 662764, 'not terminal', 1)
(2308, 668938, 'not terminal', 1)
(2329, 61322, 'not terminal', 1)
(2334, 61355, 'not terminal', 1)
(2348, 12613, 'not terminal', 1)
(2350, 12611, 'not terminal', 1)
(2372, 531930, 'not terminal', 1)
(2458, 372905, 'not terminal', 1)
(2466, 372746, 'not terminal', 1)
(2494, 370851, 'not terminal', 1)
(2502, 370599, 'not terminal', 1)
(2522, 370618, 'not terminal', 1)
(2584, 202565, 'not terminal', 1)
(2591, 202512, 'not terminal', 1)
(2596, 204789, 'not terminal', 1)
(2599, 203231, 'not terminal', 1)
(2617, 204738, 'not terminal', 1)
(2642, 652718, 'not terminal', 1)
(2654, 662248, 'not terminal', 1)
(2656, 660114, 'not terminal', 1)
(2660, 662294, 'not terminal', 1)
(2661, 662301, 'not terminal', 1)
(2663, 662177, 'not terminal', 1)
(2664, 660113, 'not terminal', 1)
(2691, 60018, 'not terminal', 1)
(2693, 59484, 'not terminal', 1)
(2695, 59329, 'not terminal', 1)
(2696, 12518, 'not terminal', 1)
(2701, 12361, 'not terminal', 1)
(2760, 472027, 'not terminal', 1)
(2825, 354996, 'not terminal', 1)
(2841, 353944, 'not terminal', 1)
(2843, 353483, 'not terminal', 1)
(2851, 352703, 'not terminal', 1)
(2905, 186059, 'not terminal', 1)
(2913, 186612, 'not terminal', 1)
(2916, 186255, 'not terminal', 1)
(2919, 186187, 'not terminal', 1)
(2932, 181709, 'not terminal', 1)
(2933, 181894, 'not terminal', 1)
(2935, 181758, 'not terminal', 1)
(2936, 181988, 'not terminal', 1)
(2952, 181692, 'not terminal', 1)
(2973, 639032, 'not terminal', 1)
(2991, 638807, 'not terminal', 1)
(2998, 651804, 'not terminal', 1)
(3003, 651573, 'not terminal', 1)
(3015, 56731, 'not terminal', 1)
(3016, 57186, 'not terminal', 1)
(3017, 57061, 'not terminal', 1)
(3021, 57254, 'not terminal', 1)
(3029, 56365, 'not terminal', 1)
(3093, 464170, 'not terminal', 1)
(3127, 337772, 'not terminal', 1)
(3148, 337640, 'not terminal', 1)
(3156, 333577, 'not terminal', 1)
(3224, 165968, 'not terminal', 1)
(3235, 163475, 'not terminal', 1)
(3237, 161994, 'not terminal', 1)
(3239, 160242, 'not terminal', 1)
(3246, 163474, 'not terminal', 1)
(3247, 161995, 'not terminal', 1)
(3248, 161991, 'not terminal', 1)
(3249, 163471, 'not terminal', 1)
(3254, 160747, 'not terminal', 1)
(3269, 622927, 'not terminal', 1)
(3271, 624138, 'not terminal', 1)
(3283, 624083, 'not terminal', 1)
(3284, 624143, 'not terminal', 1)
(3301, 51708, 'not terminal', 1)
(3305, 50760, 'not terminal', 1)
(3362, 456388, 'not terminal', 1)
(3364, 456230, 'not terminal', 1)
(3365, 456769, 'not terminal', 1)
(3370, 456302, 'not terminal', 1)
(3380, 456300, 'not terminal', 1)
(3419, 315934, 'not terminal', 1)
(3430, 315935, 'not terminal', 1)
(3431, 314507, 'not terminal', 1)
(3458, 144273, 'not terminal', 1)
(3482, 140624, 'not terminal', 1)
(3487, 136237, 'not terminal', 1)
(3492, 140571, 'not terminal', 1)
(3493, 140188, 'not terminal', 1)
(3498, 140567, 'not terminal', 1)
(3499, 140594, 'not terminal', 1)
(3526, 619055, 'not terminal', 1)
(3588, 451905, 'not terminal', 1)
(3629, 305845, 'not terminal', 1)
(3655, 300039, 'not terminal', 1)
(3656, 301802, 'not terminal', 1)
(3687, 125281, 'not terminal', 1)
(3694, 116207, 'not terminal', 1)
(3714, 592519, 'not terminal', 1)
(3771, 446183, 'not terminal', 1)
(3818, 291701, 'not terminal', 1)
(3819, 287964, 'not terminal', 1)
(3840, 100388, 'not terminal', 1)
(3842, 100550, 'not terminal', 1)
(3909, 442425, 'not terminal', 1)
(3917, 442338, 'not terminal', 1)
(3959, 277791, 'not terminal', 1)
(4036, 438626, 'not terminal', 1)
(4053, 271678, 'not terminal', 1)
(4054, 272813, 'not terminal', 1)
(4128, 266401, 'not terminal', 1)
(4154, 521439, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
304*t^4*D^3 + 1824*t^4*D^2 + 300*t^3*D^3 + 3344*t^4*D + 1350*t^3*D^2 + 88*t^2*D^3 + 1824*t^4 + 1950*t^3*D + 264*t^2*D^2 + 4*t*D^3 + 900*t^3 + 272*t^2*D + 6*t*D^2 - D^3 + 96*t^2 + 2*t*D
================================================================================
Period sequence 18
First 10 period coefficients: [1, 0, 32, 312, 5520, 91680, 1651640, 30604560, 583436560, 11352768000]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2365, 532085, 'not terminal', 1)
(2400, 483089, 'not terminal', 1)
(2463, 372785, 'not terminal', 1)
(2471, 372935, 'not terminal', 1)
(2552, 206003, 'not terminal', 1)
(2752, 474446, 'not terminal', 1)
(2764, 473336, 'not terminal', 1)
(2823, 355511, 'not terminal', 1)
(2965, 639875, 'not terminal', 1)
(3055, 527980, 'not terminal', 1)
(3081, 465958, 'not terminal', 1)
(3129, 338179, 'not terminal', 1)
(3201, 166804, 'not terminal', 1)
(3213, 165796, 'not terminal', 1)
(3215, 166501, 'not terminal', 1)
(3218, 166517, 'not terminal', 1)
(3228, 166494, 'not terminal', 1)
(3265, 625365, 'not terminal', 1)
(3267, 625031, 'not terminal', 1)
(3282, 625034, 'not terminal', 1)
(3297, 47449, 'not terminal', 1)
(3334, 526350, 'not terminal', 1)
(3350, 458642, 'not terminal', 1)
(3396, 321233, 'not terminal', 1)
(3398, 321301, 'not terminal', 1)
(3399, 321302, 'not terminal', 1)
(3447, 147436, 'not terminal', 1)
(3460, 146429, 'not terminal', 1)
(3470, 146472, 'not terminal', 1)
(3505, 610621, 'not terminal', 1)
(3508, 610744, 'not terminal', 1)
(3510, 610784, 'not terminal', 1)
(3529, 41168, 'not terminal', 1)
(3534, 41131, 'not terminal', 1)
(3535, 41126, 'not terminal', 1)
(3536, 41127, 'not terminal', 1)
(3542, 9094, 'not terminal', 1)
(3543, 9098, 'not terminal', 1)
(3558, 524993, 'not terminal', 1)
(3573, 452201, 'not terminal', 1)
(3586, 449943, 'not terminal', 1)
(3623, 306022, 'not terminal', 1)
(3628, 305762, 'not terminal', 1)
(3632, 306089, 'not terminal', 1)
(3635, 306132, 'not terminal', 1)
(3636, 306131, 'not terminal', 1)
(3639, 299475, 'not terminal', 1)
(3665, 129152, 'not terminal', 1)
(3669, 125267, 'not terminal', 1)
(3674, 127678, 'not terminal', 1)
(3675, 127722, 'not terminal', 1)
(3697, 597527, 'not terminal', 1)
(3700, 597556, 'not terminal', 1)
(3703, 597738, 'not terminal', 1)
(3711, 596349, 'not terminal', 1)
(3717, 34551, 'not terminal', 1)
(3718, 34356, 'not terminal', 1)
(3723, 7560, 'not terminal', 1)
(3764, 445117, 'not terminal', 1)
(3765, 445154, 'not terminal', 1)
(3793, 292448, 'not terminal', 1)
(3798, 292446, 'not terminal', 1)
(3799, 292443, 'not terminal', 1)
(3823, 112305, 'not terminal', 1)
(3824, 112517, 'not terminal', 1)
(3831, 108038, 'not terminal', 1)
(3836, 110185, 'not terminal', 1)
(3846, 585232, 'not terminal', 1)
(3848, 585544, 'not terminal', 1)
(3851, 585519, 'not terminal', 1)
(3854, 585566, 'not terminal', 1)
(3855, 584997, 'not terminal', 1)
(3866, 29610, 'not terminal', 1)
(3869, 28871, 'not terminal', 1)
(3870, 28930, 'not terminal', 1)
(3875, 5946, 'not terminal', 1)
(3886, 523387, 'not terminal', 1)
(3890, 442981, 'not terminal', 1)
(3895, 442754, 'not terminal', 1)
(3899, 442953, 'not terminal', 1)
(3924, 283515, 'not terminal', 1)
(3928, 282712, 'not terminal', 1)
(3930, 282243, 'not terminal', 1)
(3931, 281904, 'not terminal', 1)
(3934, 282251, 'not terminal', 1)
(3943, 282871, 'not terminal', 1)
(3946, 283322, 'not terminal', 1)
(3962, 98196, 'not terminal', 1)
(3967, 93948, 'not terminal', 1)
(3969, 94721, 'not terminal', 1)
(3972, 93843, 'not terminal', 1)
(3975, 94624, 'not terminal', 1)
(3976, 95280, 'not terminal', 1)
(3981, 574884, 'not terminal', 1)
(3985, 574262, 'not terminal', 1)
(3991, 24223, 'not terminal', 1)
(4008, 522622, 'not terminal', 1)
(4033, 438004, 'not terminal', 1)
(4045, 274849, 'not terminal', 1)
(4048, 273916, 'not terminal', 1)
(4056, 86778, 'not terminal', 1)
(4060, 87169, 'not terminal', 1)
(4061, 82704, 'not terminal', 1)
(4065, 85225, 'not terminal', 1)
(4068, 86228, 'not terminal', 1)
(4076, 564955, 'not terminal', 1)
(4077, 565284, 'not terminal', 1)
(4078, 565273, 'not terminal', 1)
(4097, 521909, 'not terminal', 1)
(4110, 435745, 'not terminal', 1)
(4119, 269275, 'not terminal', 1)
(4125, 268804, 'not terminal', 1)
(4126, 269009, 'not terminal', 1)
(4135, 77741, 'not terminal', 1)
(4137, 76994, 'not terminal', 1)
(4138, 77044, 'not terminal', 1)
(4139, 75065, 'not terminal', 1)
(4165, 434943, 'not terminal', 1)
(4170, 264166, 'not terminal', 1)
(4172, 264772, 'not terminal', 1)
(4184, 69823, 'not terminal', 1)
(4191, 521209, 'not terminal', 1)
(4197, 521161, 'not terminal', 1)
(4200, 433641, 'not terminal', 1)
(4206, 433730, 'not terminal', 1)
(4208, 433608, 'not terminal', 1)
(4220, 261600, 'not terminal', 1)
(4222, 261134, 'not terminal', 1)
(4223, 261536, 'not terminal', 1)
(4225, 67721, 'not terminal', 1)
(4239, 520906, 'not terminal', 1)
(4252, 259188, 'not terminal', 1)
(4261, 431894, 'not terminal', 1)
(4270, 257604, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
1840*t^4*D^3 + 11040*t^4*D^2 + 1208*t^3*D^3 + 20240*t^4*D + 5436*t^3*D^2 + 243*t^2*D^3 + 11040*t^4 + 7852*t^3*D + 729*t^2*D^2 + 10*t*D^3 + 3624*t^3 + 742*t^2*D + 15*t*D^2 - D^3 + 256*t^2 + 5*t*D
================================================================================
Period sequence 19
First 10 period coefficients: [1, 0, 396, 17616, 1217052, 85220640, 6349812480, 490029523200, 38883641777820, 3152020367254080]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(4281, 547396, 'not terminal', 1)
(4283, 544447, 'not terminal', 1)
(4285, 520428, 'not terminal', 1)
(4286, 520416, 'not terminal', 1)
(4296, 520331, 'not terminal', 1)
(4309, 520190, 'not terminal', 1)
(4317, 547387, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
165888*t^4*D^3 + 995328*t^4*D^2 + 39744*t^3*D^3 + 1824768*t^4*D + 178848*t^3*D^2 + 3024*t^2*D^3 + 995328*t^4 + 258336*t^3*D + 9072*t^2*D^2 + 60*t*D^3 + 119232*t^3 + 9216*t^2*D + 90*t*D^2 - D^3 + 3168*t^2 + 30*t*D
================================================================================
Period sequence 20
First 10 period coefficients: [1, 0, 24, 192, 2904, 40320, 611520, 9515520, 152412120, 2491104000]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1953, 546004, 'not terminal', 1)
(2009, 492045, 'not terminal', 1)
(2023, 491381, 'not terminal', 1)
(2092, 388964, 'not terminal', 1)
(2196, 223136, 'not terminal', 1)
(2290, 662829, 'not terminal', 1)
(2413, 482431, 'not terminal', 1)
(2436, 482420, 'not terminal', 1)
(2481, 372120, 'not terminal', 1)
(2497, 372105, 'not terminal', 1)
(2649, 652773, 'not terminal', 1)
(2723, 529956, 'not terminal', 1)
(2772, 473102, 'not terminal', 1)
(2887, 186783, 'not terminal', 1)
(2890, 186772, 'not terminal', 1)
(2893, 186627, 'not terminal', 1)
(2895, 186614, 'not terminal', 1)
(2896, 186640, 'not terminal', 1)
(2898, 186626, 'not terminal', 1)
(2902, 186306, 'not terminal', 1)
(2966, 639881, 'not terminal', 1)
(2968, 639889, 'not terminal', 1)
(2986, 639750, 'not terminal', 1)
(2987, 639688, 'not terminal', 1)
(2989, 639751, 'not terminal', 1)
(3007, 53123, 'not terminal', 1)
(3011, 53112, 'not terminal', 1)
(3012, 53111, 'not terminal', 1)
(3025, 57234, 'not terminal', 1)
(3026, 57359, 'not terminal', 1)
(3031, 11582, 'not terminal', 1)
(3033, 12197, 'not terminal', 1)
(3111, 464458, 'not terminal', 1)
(3128, 338106, 'not terminal', 1)
(3130, 338225, 'not terminal', 1)
(3131, 338235, 'not terminal', 1)
(3161, 335117, 'not terminal', 1)
(3208, 166302, 'not terminal', 1)
(3209, 165850, 'not terminal', 1)
(3226, 166025, 'not terminal', 1)
(3276, 624084, 'not terminal', 1)
(3279, 624186, 'not terminal', 1)
(3293, 47436, 'not terminal', 1)
(3295, 47424, 'not terminal', 1)
(3299, 52868, 'not terminal', 1)
(3308, 11546, 'not terminal', 1)
(3309, 11569, 'not terminal', 1)
(3311, 1454, 'not terminal', 1)
(3338, 526791, 'not terminal', 1)
(3356, 458619, 'not terminal', 1)
(3372, 455988, 'not terminal', 1)
(3373, 456763, 'not terminal', 1)
(3374, 456807, 'not terminal', 1)
(3375, 456805, 'not terminal', 1)
(3395, 321327, 'not terminal', 1)
(3400, 321353, 'not terminal', 1)
(3408, 321054, 'not terminal', 1)
(3454, 145662, 'not terminal', 1)
(3461, 145189, 'not terminal', 1)
(3463, 146791, 'not terminal', 1)
(3472, 146294, 'not terminal', 1)
(3476, 146798, 'not terminal', 1)
(3511, 610605, 'not terminal', 1)
(3512, 610156, 'not terminal', 1)
(3514, 608808, 'not terminal', 1)
(3517, 608909, 'not terminal', 1)
(3518, 608870, 'not terminal', 1)
(3528, 41156, 'not terminal', 1)
(3530, 40830, 'not terminal', 1)
(3531, 40767, 'not terminal', 1)
(3532, 41052, 'not terminal', 1)
(3537, 41139, 'not terminal', 1)
(3541, 9091, 'not terminal', 1)
(3545, 10501, 'not terminal', 1)
(3600, 450189, 'not terminal', 1)
(3601, 449940, 'not terminal', 1)
(3613, 449941, 'not terminal', 1)
(3641, 299999, 'not terminal', 1)
(3647, 301745, 'not terminal', 1)
(3663, 129141, 'not terminal', 1)
(3673, 126173, 'not terminal', 1)
(3684, 126035, 'not terminal', 1)
(3685, 125153, 'not terminal', 1)
(3686, 125313, 'not terminal', 1)
(3699, 597548, 'not terminal', 1)
(3702, 597551, 'not terminal', 1)
(3708, 595052, 'not terminal', 1)
(3709, 595268, 'not terminal', 1)
(3710, 595226, 'not terminal', 1)
(3719, 34364, 'not terminal', 1)
(3720, 40408, 'not terminal', 1)
(3724, 1223, 'not terminal', 1)
(3741, 524265, 'not terminal', 1)
(3758, 446950, 'not terminal', 1)
(3782, 445152, 'not terminal', 1)
(3796, 293345, 'not terminal', 1)
(3797, 292762, 'not terminal', 1)
(3801, 292681, 'not terminal', 1)
(3802, 292451, 'not terminal', 1)
(3815, 288486, 'not terminal', 1)
(3827, 112423, 'not terminal', 1)
(3829, 108209, 'not terminal', 1)
(3832, 109121, 'not terminal', 1)
(3835, 111932, 'not terminal', 1)
(3850, 585038, 'not terminal', 1)
(3853, 584967, 'not terminal', 1)
(3857, 579004, 'not terminal', 1)
(3859, 580257, 'not terminal', 1)
(3863, 582522, 'not terminal', 1)
(3864, 582645, 'not terminal', 1)
(3871, 28869, 'not terminal', 1)
(3872, 28187, 'not terminal', 1)
(3903, 443014, 'not terminal', 1)
(3913, 442583, 'not terminal', 1)
(3933, 283208, 'not terminal', 1)
(3938, 281831, 'not terminal', 1)
(3944, 282143, 'not terminal', 1)
(3953, 278160, 'not terminal', 1)
(3971, 94626, 'not terminal', 1)
(3974, 93844, 'not terminal', 1)
(3988, 569725, 'not terminal', 1)
(3989, 568994, 'not terminal', 1)
(3992, 23122, 'not terminal', 1)
(3997, 544752, 'not terminal', 1)
(4015, 522325, 'not terminal', 1)
(4044, 275383, 'not terminal', 1)
(4049, 272798, 'not terminal', 1)
(4062, 82771, 'not terminal', 1)
(4064, 85219, 'not terminal', 1)
(4066, 85150, 'not terminal', 1)
(4071, 86196, 'not terminal', 1)
(4108, 436835, 'not terminal', 1)
(4120, 268442, 'not terminal', 1)
(4136, 76930, 'not terminal', 1)
(4145, 555757, 'not terminal', 1)
(4149, 521466, 'not terminal', 1)
(4151, 521506, 'not terminal', 1)
(4162, 435181, 'not terminal', 1)
(4163, 434689, 'not terminal', 1)
(4164, 434819, 'not terminal', 1)
(4171, 264649, 'not terminal', 1)
(4174, 264553, 'not terminal', 1)
(4226, 67006, 'not terminal', 1)
(4263, 431653, 'not terminal', 1)
(4301, 520292, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
1024*t^4*D^3 + 6144*t^4*D^2 + 768*t^3*D^3 + 11264*t^4*D + 3456*t^3*D^2 + 176*t^2*D^3 + 6144*t^4 + 4992*t^3*D + 528*t^2*D^2 + 8*t*D^3 + 2304*t^3 + 544*t^2*D + 12*t*D^2 - D^3 + 192*t^2 + 4*t*D
================================================================================
Period sequence 21
First 10 period coefficients: [1, 0, 6, 0, 90, 0, 1860, 0, 44730, 0]
The PF operator has N=3, r=4
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(17, 544342, 'not terminal', 2)
(30, 520140, 'smooth', 3)
(121, 519664, 'not terminal', 1)
(155, 430096, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
144*t^4*D^3 + 864*t^4*D^2 + 1584*t^4*D - 40*t^2*D^3 + 864*t^4 - 120*t^2*D^2 - 128*t^2*D + D^3 - 48*t^2
================================================================================
Period sequence 22
First 10 period coefficients: [1, 0, 54, 672, 15642, 336960, 7919460, 191177280, 4751272890, 120527514240]
The PF operator has N=3, r=4
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2816, 355616, 'not terminal', 1)
(3328, 545072, 'not terminal', 2)
(3349, 525553, 'not terminal', 3)
(3392, 321879, 'not terminal', 1)
(3446, 147470, 'not terminal', 1)
(3504, 610803, 'not terminal', 1)
(3739, 524375, 'not terminal', 1)
(3790, 294031, 'not terminal', 1)
(3794, 292940, 'not terminal', 1)
(3843, 585895, 'not terminal', 1)
(3844, 585890, 'not terminal', 1)
(3845, 585897, 'not terminal', 1)
(3867, 29624, 'not terminal', 1)
(3873, 5953, 'not terminal', 1)
(3874, 5954, 'not terminal', 1)
(3966, 95245, 'not terminal', 1)
(4026, 439663, 'not terminal', 1)
(4057, 87167, 'not terminal', 1)
(4074, 566716, 'not terminal', 1)
(4075, 566695, 'not terminal', 1)
(4168, 264855, 'not terminal', 1)
(4181, 72684, 'not terminal', 1)
(4182, 72202, 'not terminal', 1)
(4240, 520890, 'not terminal', 1)
(4248, 432464, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
2160*t^4*D^3 + 12960*t^4*D^2 + 1728*t^3*D^3 + 23760*t^4*D + 7776*t^3*D^2 + 360*t^2*D^3 + 12960*t^4 + 11232*t^3*D + 1080*t^2*D^2 + 16*t*D^3 + 5184*t^3 + 1152*t^2*D + 24*t*D^2 - D^3 + 432*t^2 + 8*t*D
================================================================================
Period sequence 23
First 10 period coefficients: [1, 0, 18, 84, 1446, 12960, 186840, 2126880, 29469510, 373971360]
The PF operator has N=4, r=7
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1585, 500520, 'not terminal', 1)
(2008, 492025, 'not terminal', 1)
(2452, 372986, 'not terminal', 1)
(2815, 355617, 'not terminal', 1)
(3079, 465930, 'not terminal', 1)
(3080, 465994, 'not terminal', 1)
(3388, 321878, 'not terminal', 1)
(3756, 446949, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
4587840*t^7*D^4 + 45878400*t^7*D^3 + 14680384*t^6*D^4 + 160574400*t^7*D^2 + 136336640*t^6*D^3 + 15498480*t^5*D^4 + 229392000*t^7*D + 451010240*t^6*D^2 + 118279776*t^5*D^3 + 6837792*t^4*D^4 + 110108160*t^7 + 618880000*t^6*D + 322290672*t^5*D^2 + 38371680*t^4*D^3 + 1094476*t^3*D^4 + 289526016*t^6 + 371390784*t^5*D + 76937952*t^4*D^2 + 3710840*t^3*D^3 - 11884*t^2*D^4 + 151881408*t^5 + 67045536*t^4*D + 4276436*t^3*D^2 - 20704*t^2*D^3 - 6343*t*D^4 + 21641472*t^4 + 1938712*t^3*D - 52164*t^2*D^2 + 9546*t*D^3 + 36*D^4 + 262224*t^3 - 37512*t^2*D - 179*t*D^2 - 18*D^3 - 7776*t^2 - 36*t*D
================================================================================
Period sequence 24
First 10 period coefficients: [1, 0, 20, 96, 1428, 14160, 179120, 2157120, 27682900, 356868960]
The PF operator has N=4, r=7
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(486, 543405, 'not terminal', 2)
(1176, 539052, 'not terminal', 2)
(1216, 507648, 'not terminal', 1)
(1250, 506814, 'not terminal', 2)
(1286, 413305, 'not terminal', 1)
(1292, 413261, 'not terminal', 2)
(1963, 546005, 'not terminal', 1)
(2026, 490442, 'not terminal', 1)
(2097, 388876, 'not terminal', 1)
(2101, 388943, 'not terminal', 1)
(2737, 530243, 'not terminal', 1)
(2776, 473967, 'not terminal', 1)
(2777, 472341, 'not terminal', 1)
(2791, 472855, 'not terminal', 1)
(2818, 355607, 'not terminal', 1)
(2819, 354967, 'not terminal', 1)
(3329, 526889, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
70963200*t^7*D^4 + 709632000*t^7*D^3 + 29569024*t^6*D^4 + 2483712000*t^7*D^2 + 273649664*t^6*D^3 - 5427968*t^5*D^4 + 3548160000*t^7*D + 902672384*t^6*D^2 - 17049088*t^5*D^3 - 4081152*t^4*D^4 + 1703116800*t^7 + 1236004864*t^6*D - 4039936*t^5*D^2 - 16494592*t^4*D^3 - 509200*t^3*D^4 + 577413120*t^6 + 25804288*t^5*D - 27204352*t^4*D^2 - 1602720*t^3*D^3 + 9328*t^2*D^4 + 18223104*t^5 - 22324992*t^4*D - 1822320*t^3*D^2 - 29872*t^2*D^3 + 3063*t*D^4 - 7534080*t^4 - 934240*t^3*D + 27840*t^2*D^2 - 4402*t*D^3 - 20*D^4 - 159360*t^3 + 21440*t^2*D + 149*t*D^2 + 10*D^3 + 4800*t^2 + 30*t*D
================================================================================
Period sequence 25
First 10 period coefficients: [1, 0, 10, 24, 366, 1800, 20620, 137760, 1415470, 11079600]
The PF operator has N=4, r=7
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(235, 518832, 'not terminal', 1)
(462, 543573, 'not terminal', 1)
(515, 516967, 'not terminal', 1)
(522, 516968, 'not terminal', 1)
(605, 425466, 'not terminal', 1)
(785, 541661, 'not terminal', 1)
(823, 513288, 'not terminal', 1)
(1188, 507627, 'not terminal', 1)
(1270, 413296, 'not terminal', 1)
(1532, 546372, 'not terminal', 1)
(1543, 537089, 'not terminal', 1)
(1549, 536890, 'not terminal', 1)
(1550, 537123, 'not terminal', 1)
(1688, 402548, 'not terminal', 1)
(2087, 388967, 'not terminal', 1)
(2401, 483090, 'not terminal', 1)
(2419, 482425, 'not terminal', 1)
(2551, 206002, 'not terminal', 1)
(2766, 473062, 'not terminal', 1)
(3108, 464417, 'not terminal', 1)
(3149, 338160, 'not terminal', 1)
(3560, 525022, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
137280*t^7*D^4 + 1372800*t^7*D^3 + 1412544*t^6*D^4 + 4804800*t^7*D^2 + 11606784*t^6*D^3 + 3419632*t^5*D^4 + 6864000*t^7*D + 34327104*t^6*D^2 + 25367904*t^5*D^3 + 2472288*t^4*D^4 + 3294720*t^7 + 42921984*t^6*D + 67568528*t^5*D^2 + 13829088*t^4*D^3 + 544060*t^3*D^4 + 18789120*t^6 + 76424736*t^5*D + 27749088*t^4*D^2 + 1856344*t^3*D^3 - 15812*t^2*D^4 + 30804480*t^5 + 24543648*t^4*D + 2212372*t^3*D^2 - 20544*t^2*D^3 - 6511*t*D^4 + 8151360*t^4 + 1073848*t^3*D - 35932*t^2*D^2 + 9994*t*D^3 + 52*D^4 + 163680*t^3 - 26520*t^2*D - 129*t*D^2 - 26*D^3 - 6240*t^2 - 26*t*D
================================================================================
Period sequence 26
First 10 period coefficients: [1, 0, 26, 216, 3582, 54480, 874700, 15000720, 256965310, 4576672800]
The PF operator has N=4, r=7
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1968, 545881, 'not terminal', 2)
(2453, 372990, 'not terminal', 1)
(2549, 206005, 'not terminal', 1)
(2886, 186785, 'not terminal', 1)
(2961, 639892, 'not terminal', 1)
(3125, 338525, 'not terminal', 1)
(3136, 338256, 'not terminal', 1)
(3261, 625382, 'not terminal', 1)
(3262, 625383, 'not terminal', 1)
(3350, 458642, 'not terminal', 1)
(3445, 147462, 'not terminal', 1)
(3503, 610802, 'not terminal', 1)
(3667, 129150, 'not terminal', 1)
(3696, 597806, 'not terminal', 1)
(3826, 112528, 'not terminal', 1)
(3925, 283518, 'not terminal', 1)
(4008, 522622, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
11030784*t^7*D^4 + 110307840*t^7*D^3 + 17910464*t^6*D^4 + 386077440*t^7*D^2 + 150449728*t^6*D^3 + 10313344*t^5*D^4 + 551539200*t^7*D + 454936768*t^6*D^2 + 69464704*t^5*D^3 + 2387600*t^4*D^4 + 264738816*t^7 + 580319168*t^6*D + 170978752*t^5*D^2 + 11737776*t^4*D^3 + 158160*t^3*D^4 + 257921664*t^6 + 181383488*t^5*D + 20414416*t^4*D^2 + 398112*t^3*D^3 - 4588*t^2*D^4 + 69556096*t^5 + 14672816*t^4*D + 169456*t^3*D^2 - 5716*t^2*D^3 - 608*t*D^4 + 3608576*t^4 - 153016*t^3*D - 15200*t^2*D^2 + 1272*t*D^3 + 7*D^4 - 91216*t^3 - 8624*t^2*D - 20*t*D^2 - 7*D^3 - 1456*t^2
================================================================================
Period sequence 27
First 10 period coefficients: [1, 0, 68, 960, 28116, 689040, 19724720, 558102720, 16587590740, 498352696800]
The PF operator has N=4, r=7
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(3878, 523456, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
778014720*t^7*D^4 + 7780147200*t^7*D^3 + 878155776*t^6*D^4 + 27230515200*t^7*D^2 + 7532752896*t^6*D^3 + 373208832*t^5*D^4 + 38900736000*t^7*D + 23242622976*t^6*D^2 + 2600013312*t^5*D^3 + 71690496*t^4*D^4 + 18672353280*t^7 + 30170935296*t^6*D + 6644047104*t^5*D^2 + 372996096*t^4*D^3 + 5440880*t^3*D^4 + 13582909440*t^6 + 7330180608*t^5*D + 715226880*t^4*D^2 + 18001760*t^3*D^3 + 11544*t^2*D^4 + 2912937984*t^5 + 604019712*t^4*D + 19821904*t^3*D^2 + 27504*t^2*D^3 - 7143*t*D^4 + 190098432*t^4 + 8414560*t^3*D - 133560*t^2*D^2 + 10242*t*D^3 + 20*D^4 + 1008384*t^3 - 95280*t^2*D - 349*t*D^2 - 10*D^3 - 16320*t^2 - 70*t*D
================================================================================
Period sequence 28
First 10 period coefficients: [1, 0, 4, 24, 60, 720, 3640, 21840, 175420, 1024800]
The PF operator has N=4, r=8
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(175, 430077, 'not terminal', 2)
(198, 255743, 'terminal', 2)
(250, 518658, 'not terminal', 2)
(383, 254881, 'not terminal', 2)
(409, 61986, 'terminal', 2)
(519, 516943, 'not terminal', 1)
(548, 516715, 'not terminal', 2)
(626, 425359, 'not terminal', 2)
(684, 254010, 'not terminal', 2)
(878, 512841, 'not terminal', 2)
(1026, 251647, 'not terminal', 1)
(1338, 413231, 'not terminal', 1)
(1431, 246112, 'not terminal', 1)
(1473, 672934, 'not terminal', 1)
(1625, 499868, 'not terminal', 1)
(1644, 500326, 'not terminal', 1)
(1841, 236296, 'not terminal', 1)
(2156, 388153, 'not terminal', 1)
(2796, 473037, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
28672*t^8*D^4 + 215040*t^8*D^3 + 102912*t^7*D^4 + 573440*t^8*D^2 + 690176*t^7*D^3 + 141696*t^6*D^4 + 645120*t^8*D + 1707776*t^7*D^2 + 857216*t^6*D^3 + 90800*t^5*D^4 + 258048*t^8 + 1835776*t^7*D + 1952064*t^6*D^2 + 493280*t^5*D^3 + 24572*t^4*D^4 + 715264*t^7 + 1984960*t^6*D + 1003216*t^5*D^2 + 113884*t^4*D^3 + 935*t^3*D^4 + 748416*t^6 + 926304*t^5*D + 189504*t^4*D^2 + 2790*t^3*D^3 - 356*t^2*D^4 + 325696*t^5 + 134240*t^4*D - 3185*t^3*D^2 + 242*t^2*D^3 - 61*t*D^4 + 33760*t^4 - 6688*t^3*D - 452*t^2*D^2 + 134*t*D^3 + 2*D^4 - 2960*t^3 - 288*t^2*D - t*D^2 - 2*D^3 - 64*t^2
================================================================================
Period sequence 29
First 10 period coefficients: [1, 0, 8, 12, 216, 720, 8540, 42000, 410200, 2503200]
The PF operator has N=4, r=8
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(39, 544231, 'not terminal', 2)
(265, 518647, 'not terminal', 2)
(299, 429081, 'not terminal', 2)
(303, 429058, 'not terminal', 2)
(371, 254878, 'not terminal', 2)
(410, 61987, 'terminal', 2)
(559, 516571, 'not terminal', 2)
(689, 254015, 'not terminal', 2)
(764, 546751, 'not terminal', 2)
(805, 541365, 'not terminal', 2)
(806, 541058, 'not terminal', 2)
(856, 513273, 'not terminal', 1)
(926, 420892, 'not terminal', 1)
(932, 420899, 'not terminal', 2)
(1035, 251645, 'not terminal', 1)
(1164, 539009, 'not terminal', 2)
(1228, 505533, 'not terminal', 2)
(1340, 413143, 'not terminal', 1)
(1412, 246228, 'not terminal', 1)
(1474, 672933, 'not terminal', 1)
(1580, 535749, 'not terminal', 2)
(1624, 500308, 'not terminal', 1)
(1844, 236253, 'not terminal', 1)
(1848, 236548, 'not terminal', 1)
(2122, 388247, 'not terminal', 1)
(2159, 388451, 'not terminal', 1)
(2781, 472391, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
7022288*t^8*D^4 + 52667160*t^8*D^3 + 18116644*t^7*D^4 + 140445760*t^8*D^2 + 106996162*t^7*D^3 + 15743000*t^6*D^4 + 158001480*t^8*D + 235890018*t^7*D^2 + 71951880*t^6*D^3 + 5195320*t^5*D^4 + 63200592*t^8 + 230446580*t^7*D + 128307816*t^6*D^2 + 19486558*t^5*D^3 + 506973*t^4*D^4 + 83436080*t^7 + 105777672*t^6*D + 27271322*t^5*D^2 + 1971013*t^4*D^3 - 49784*t^3*D^4 + 33678736*t^6 + 17093440*t^5*D + 1457736*t^4*D^2 + 124104*t^3*D^3 - 10344*t^2*D^4 + 4001608*t^5 + 193008*t^4*D - 50784*t^3*D^2 + 17582*t^2*D^3 - 248*t*D^4 - 161776*t^4 - 73364*t^3*D - 6392*t^2*D^2 + 796*t*D^3 + 15*D^4 - 28664*t^3 - 4080*t^2*D - 8*t*D^2 - 15*D^3 - 960*t^2
================================================================================
Period sequence 30
First 10 period coefficients: [1, 0, 2, 0, 30, 0, 380, 0, 5950, 0]
The PF operator has N=4, r=8
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(5, 544391, 'smooth', 2)
(41, 520061, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
1040000*t^8*D^4 + 11440000*t^8*D^3 + 42640000*t^8*D^2 + 165600*t^6*D^4 + 63440000*t^8*D + 915200*t^6*D^3 + 31200000*t^8 + 1392800*t^6*D^2 + 3296*t^4*D^4 + 297600*t^6*D - 10032*t^4*D^3 - 345600*t^6 - 66416*t^4*D^2 - 706*t^2*D^4 - 93408*t^4*D + 2432*t^2*D^3 - 40320*t^4 - 304*t^2*D^2 + 7*D^4 - 112*t^2*D - 14*D^3
================================================================================
Period sequence 31
First 10 period coefficients: [1, 0, 20, 132, 1812, 21720, 289100, 3927840, 54999700, 785606640]
The PF operator has N=4, r=9
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1306, 413232, 'not terminal', 1)
(1691, 402539, 'not terminal', 1)
(1725, 402427, 'not terminal', 1)
(1791, 236722, 'not terminal', 1)
(1804, 236599, 'not terminal', 1)
(1832, 236598, 'not terminal', 2)
(2002, 533765, 'not terminal', 2)
(2069, 489480, 'not terminal', 2)
(2119, 388519, 'not terminal', 1)
(2269, 662845, 'not terminal', 1)
(2298, 662833, 'not terminal', 1)
(2300, 662770, 'not terminal', 1)
(2376, 532084, 'not terminal', 1)
(2524, 372151, 'not terminal', 1)
(2564, 205912, 'not terminal', 1)
(2565, 205541, 'not terminal', 1)
(2578, 205968, 'not terminal', 1)
(2593, 202609, 'not terminal', 2)
(2601, 204893, 'not terminal', 1)
(2637, 652771, 'not terminal', 1)
(2677, 658964, 'not terminal', 3)
(2679, 57386, 'not terminal', 1)
(2690, 59974, 'not terminal', 1)
(2762, 473300, 'not terminal', 1)
(2802, 473257, 'not terminal', 1)
(2824, 355442, 'not terminal', 1)
(2940, 184644, 'not terminal', 1)
(2963, 639872, 'not terminal', 1)
(2969, 639834, 'not terminal', 1)
(3000, 651861, 'not terminal', 2)
(3019, 57256, 'not terminal', 1)
(3023, 57290, 'not terminal', 1)
(3036, 12161, 'not terminal', 1)
(3037, 1505, 'not terminal', 1)
(3140, 337773, 'not terminal', 1)
(3143, 338018, 'not terminal', 1)
(3165, 333526, 'not terminal', 2)
(3177, 335683, 'not terminal', 1)
(3204, 164775, 'not terminal', 1)
(3266, 625241, 'not terminal', 1)
(3275, 624073, 'not terminal', 1)
(3277, 624451, 'not terminal', 1)
(3278, 624132, 'not terminal', 1)
(3280, 624343, 'not terminal', 1)
(3292, 47445, 'not terminal', 1)
(3307, 11568, 'not terminal', 1)
(3341, 526344, 'not terminal', 1)
(3409, 321331, 'not terminal', 1)
(3444, 308463, 'not terminal', 2)
(3448, 147317, 'not terminal', 1)
(3455, 144137, 'not terminal', 1)
(3459, 145359, 'not terminal', 1)
(3466, 145002, 'not terminal', 1)
(3516, 608627, 'not terminal', 1)
(3533, 40829, 'not terminal', 1)
(3574, 452184, 'not terminal', 1)
(3678, 126080, 'not terminal', 1)
(3683, 126503, 'not terminal', 1)
(3706, 595148, 'not terminal', 1)
(3712, 592451, 'not terminal', 1)
(3721, 37682, 'not terminal', 1)
(3722, 39241, 'not terminal', 1)
(3767, 446903, 'not terminal', 1)
(3828, 108694, 'not terminal', 1)
(3834, 111798, 'not terminal', 1)
(3894, 443054, 'not terminal', 1)
(3947, 283006, 'not terminal', 1)
(3968, 96299, 'not terminal', 1)
(3970, 96497, 'not terminal', 1)
(3986, 568804, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
222095360*t^9*D^4 + 1665715200*t^9*D^3 + 345931776*t^8*D^4 + 4441907200*t^9*D^2 + 2281376256*t^8*D^3 + 229028480*t^7*D^4 + 4997145600*t^9*D + 5554744352*t^8*D^2 + 1306669376*t^7*D^3 + 82528576*t^6*D^4 + 1998858240*t^9 + 5883575904*t^8*D + 2868423472*t^7*D^2 + 399085344*t^6*D^3 + 16972128*t^5*D^4 + 2264276032*t^8 + 2829735632*t^7*D + 769707960*t^6*D^2 + 68230608*t^5*D^3 + 1813144*t^4*D^4 + 1038953056*t^7 + 688916744*t^6*D + 108748884*t^5*D^2 + 6230512*t^4*D^3 + 47372*t^3*D^4 + 235432880*t^6 + 82905564*t^5*D + 6667872*t^4*D^2 + 281640*t^3*D^3 - 8046*t^2*D^4 + 24529384*t^5 + 3410144*t^4*D - 19240*t^3*D^2 + 13050*t^2*D^3 - 499*t*D^4 + 539968*t^4 - 124576*t^3*D - 12938*t^2*D^2 + 998*t*D^3 + 9*D^4 - 61672*t^3 - 7632*t^2*D - 31*t*D^2 - 9*D^3 - 1440*t^2
================================================================================
Period sequence 32
First 10 period coefficients: [1, 0, 10, 24, 318, 1680, 16300, 115920, 1040830, 8403360]
The PF operator has N=4, r=9
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(108, 544035, 'not terminal', 2)
(152, 519315, 'not terminal', 3)
(512, 516974, 'not terminal', 1)
(602, 515147, 'not terminal', 3)
(663, 425399, 'not terminal', 3)
(683, 426420, 'not terminal', 4)
(727, 254351, 'not terminal', 4)
(734, 674679, 'terminal', 4)
(821, 540271, 'not terminal', 3)
(1132, 539540, 'not terminal', 1)
(1178, 537416, 'not terminal', 3)
(1267, 503423, 'not terminal', 3)
(1268, 502589, 'not terminal', 3)
(1388, 246297, 'not terminal', 1)
(1399, 246050, 'not terminal', 2)
(1459, 251332, 'not terminal', 2)
(1517, 61936, 'not terminal', 2)
(1657, 498815, 'not terminal', 2)
(1975, 545862, 'not terminal', 2)
(2086, 388962, 'not terminal', 1)
(2131, 386440, 'not terminal', 1)
(2193, 223127, 'not terminal', 1)
(2333, 61316, 'not terminal', 1)
(2395, 531279, 'not terminal', 2)
(2414, 482045, 'not terminal', 1)
(2431, 482353, 'not terminal', 1)
(3002, 649478, 'not terminal', 1)
(3339, 526756, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
The PF operator for this sequence is:
11566080*t^9*D^4 + 115660800*t^9*D^3 + 13608192*t^8*D^4 + 404812800*t^9*D^2 + 121931520*t^8*D^3 + 2821120*t^7*D^4 + 578304000*t^9*D + 391384320*t^8*D^2 + 33887232*t^7*D^3 - 2426880*t^6*D^4 + 277585920*t^9 + 524755200*t^8*D + 121295872*t^7*D^2 - 5195264*t^6*D^3 - 1413248*t^5*D^4 + 241694208*t^8 + 168993792*t^7*D + 3240448*t^6*D^2 - 4622720*t^5*D^3 - 256864*t^4*D^4 + 78764032*t^7 + 14151296*t^6*D - 5887616*t^5*D^2 - 899296*t^4*D^3 - 4544*t^3*D^4 + 8142464*t^6 - 3506528*t^5*D - 975312*t^4*D^2 - 64256*t^3*D^3 + 3296*t^2*D^4 - 828352*t^5 - 507088*t^4*D - 1936*t^3*D^2 - 4000*t^2*D^3 + 204*t*D^4 - 87360*t^4 + 23688*t^3*D + 3872*t^2*D^2 - 464*t*D^3 - 7*D^4 + 13232*t^3 + 2464*t^2*D + 8*t*D^2 + 7*D^3 + 560*t^2
================================================================================
Period sequence 33
First 10 period coefficients: [1, 0, 0, 18, 24, 0, 1350, 3780, 2520, 141120]
The PF operator has N=4, r=9
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(33, 544228, 'not terminal', 2)
(54, 520050, 'not terminal', 2)
(68, 430441, 'terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
9142617*t^9*D^4 + 91426170*t^9*D^3 + 7509338*t^8*D^4 + 319991595*t^9*D^2 + 40736104*t^8*D^3 - 6248348*t^7*D^4 + 457130850*t^9*D + 56683174*t^8*D^2 - 50051136*t^7*D^3 - 43278*t^6*D^4 + 219422808*t^9 - 2463136*t^8*D - 128443030*t^7*D^2 + 24372222*t^6*D^3 + 3155890*t^5*D^4 - 25919544*t^8 - 128696358*t^7*D + 120919668*t^6*D^2 + 16440620*t^5*D^3 - 1286250*t^4*D^4 - 44056116*t^7 + 190096824*t^6*D + 26961530*t^5*D^2 - 7078796*t^4*D^3 + 94004*t^3*D^4 + 93592656*t^6 + 13198072*t^5*D - 14086364*t^4*D^2 + 258124*t^3*D^3 - 28090*t^2*D^4 - 594732*t^5 - 11564832*t^4*D + 794208*t^3*D^2 + 31654*t^2*D^3 + 7277*t*D^4 - 3347496*t^4 + 773664*t^3*D + 1678*t^2*D^2 - 12314*t*D^3 - 280*D^4 + 272160*t^3 + 1280*t^2*D + 77*t*D^2 + 280*D^3
================================================================================
Period sequence 34
First 10 period coefficients: [1, 0, 66, 816, 20214, 449640, 11050500, 278336520, 7229175030, 191680807920]
The PF operator has N=4, r=9
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(3451, 147467, 'not terminal', 1)
(3452, 146786, 'not terminal', 2)
(3735, 544855, 'not terminal', 2)
(3761, 446913, 'not terminal', 1)
(3776, 444999, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
45039227688*t^9*D^4 + 450392276880*t^9*D^3 + 35129154060*t^8*D^4 + 1576372969080*t^9*D^2 + 315152058312*t^8*D^3 + 10491353010*t^7*D^4 + 2251961384400*t^9*D + 1012683498372*t^8*D^2 + 86142511044*t^7*D^3 + 1317514185*t^6*D^4 + 1080941464512*t^9 + 1358923397832*t^8*D + 256248076590*t^7*D^2 + 10765846098*t^6*D^3 + 7235991*t^5*D^4 + 626262803712*t^8 + 323116947612*t^7*D + 30006810255*t^6*D^2 + 427208376*t^5*D^3 - 14717714*t^4*D^4 + 142520029056*t^7 + 35106001302*t^6*D + 1278571479*t^5*D^2 - 28693274*t^4*D^3 - 1154076*t^3*D^4 + 14547522960*t^6 + 1383489438*t^5*D - 22692156*t^4*D^2 - 2622354*t^3*D^3 + 3793*t^2*D^4 + 522136320*t^5 - 12073248*t^4*D - 1132028*t^3*D^2 - 55332*t^2*D^3 + 2091*t*D^4 - 2322024*t^4 - 169428*t^3*D + 84265*t^2*D^2 - 2922*t*D^3 - 20*D^4 + 169800*t^3 + 53760*t^2*D + 175*t*D^2 + 20*D^3 + 10560*t^2
================================================================================
Period sequence 35
First 10 period coefficients: [1, 0, 12, 36, 564, 3600, 41700, 360360, 3839220, 37749600]
The PF operator has N=4, r=9
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(910, 420831, 'not terminal', 2)
(1273, 413307, 'not terminal', 1)
(1385, 246296, 'not terminal', 1)
(1572, 535491, 'not terminal', 2)
(1598, 500361, 'not terminal', 2)
(1697, 402552, 'not terminal', 1)
(1870, 669490, 'not terminal', 1)
(2185, 223128, 'not terminal', 1)
(2271, 662847, 'not terminal', 1)
(2556, 205601, 'not terminal', 1)
(2559, 205721, 'not terminal', 1)
(2574, 205920, 'not terminal', 1)
(2834, 355498, 'not terminal', 1)
(3127, 337772, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
2270400*t^9*D^4 + 22704000*t^9*D^3 + 10629568*t^8*D^4 + 79464000*t^9*D^2 + 91607648*t^8*D^3 + 19605808*t^7*D^4 + 113520000*t^9*D + 283906688*t^8*D^2 + 141036704*t^7*D^3 + 17824032*t^6*D^4 + 54489600*t^9 + 369910048*t^8*D + 374627984*t^7*D^2 + 102767712*t^6*D^3 + 8066004*t^5*D^4 + 166981440*t^8 + 430714144*t^7*D + 224146632*t^6*D^2 + 35386008*t^5*D^3 + 1543220*t^4*D^4 + 177517056*t^7 + 217878072*t^6*D + 58691292*t^5*D^2 + 4789694*t^4*D^3 + 39233*t^3*D^4 + 78675120*t^6 + 43647720*t^5*D + 4229442*t^4*D^2 + 43214*t^3*D^3 - 16222*t^2*D^4 + 12248832*t^5 + 439656*t^4*D - 510693*t^3*D^2 + 8293*t^2*D^3 - 803*t*D^4 - 635712*t^4 - 618918*t^3*D - 20591*t^2*D^2 + 3333*t*D^3 + 44*D^4 - 213840*t^3 - 6886*t^2*D + 88*t*D^2 - 88*D^3 + 44*t*D
================================================================================
Period sequence 36
First 10 period coefficients: [1, 0, 10, 48, 438, 3720, 33940, 320040, 3096310, 30581040]
The PF operator has N=4, r=9
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(262, 518727, 'not terminal', 2)
(629, 425411, 'not terminal', 2)
(958, 420501, 'not terminal', 2)
(1024, 251677, 'not terminal', 2)
(1046, 253997, 'not terminal', 2)
(1054, 253914, 'not terminal', 2)
(1074, 253994, 'not terminal', 2)
(1235, 506661, 'not terminal', 2)
(1236, 506616, 'not terminal', 2)
(1246, 506617, 'not terminal', 2)
(1302, 413050, 'not terminal', 1)
(1320, 413110, 'not terminal', 1)
(1373, 411823, 'not terminal', 2)
(1394, 246053, 'not terminal', 1)
(1416, 246242, 'not terminal', 2)
(1447, 251470, 'not terminal', 2)
(1460, 250869, 'not terminal', 2)
(1461, 251485, 'not terminal', 2)
(1521, 61945, 'not terminal', 2)
(1525, 61930, 'not terminal', 3)
(1528, 12648, 'terminal', 3)
(1659, 498690, 'not terminal', 2)
(1717, 401296, 'not terminal', 1)
(1771, 400378, 'not terminal', 2)
(1812, 236242, 'not terminal', 1)
(1878, 669466, 'not terminal', 1)
(1891, 672641, 'not terminal', 1)
(1911, 672298, 'not terminal', 2)
(1918, 672371, 'not terminal', 2)
(1921, 670863, 'not terminal', 3)
(1924, 61810, 'not terminal', 1)
(1932, 61797, 'not terminal', 2)
(2020, 491237, 'not terminal', 1)
(2068, 488671, 'not terminal', 2)
(2084, 388931, 'not terminal', 1)
(2118, 387296, 'not terminal', 1)
(2147, 388435, 'not terminal', 1)
(2149, 388568, 'not terminal', 1)
(2152, 387007, 'not terminal', 1)
(2206, 220898, 'not terminal', 1)
(2209, 220595, 'not terminal', 1)
(2210, 222581, 'not terminal', 2)
(2216, 222714, 'not terminal', 1)
(2225, 222414, 'not terminal', 1)
(2246, 222570, 'not terminal', 1)
(2255, 234481, 'not terminal', 2)
(2257, 234713, 'not terminal', 2)
(2261, 234741, 'not terminal', 2)
(2264, 234666, 'not terminal', 2)
(2276, 662810, 'not terminal', 1)
(2279, 662688, 'not terminal', 1)
(2292, 662763, 'not terminal', 1)
(2309, 667989, 'not terminal', 2)
(2314, 669245, 'not terminal', 1)
(2317, 669420, 'not terminal', 1)
(2318, 669041, 'not terminal', 1)
(2328, 61317, 'not terminal', 1)
(2337, 61130, 'not terminal', 2)
(2339, 61054, 'not terminal', 2)
(2344, 61283, 'not terminal', 1)
(2347, 60878, 'not terminal', 2)
(2351, 12607, 'not terminal', 1)
(2354, 1517, 'not terminal', 2)
(2443, 479735, 'not terminal', 2)
(2487, 370592, 'not terminal', 1)
(2505, 369255, 'not terminal', 1)
(2511, 370577, 'not terminal', 1)
(2614, 202520, 'not terminal', 1)
(2620, 205034, 'not terminal', 1)
(2638, 652299, 'not terminal', 1)
(2659, 660595, 'not terminal', 1)
(2676, 662358, 'not terminal', 1)
(2686, 60022, 'not terminal', 1)
(2733, 529945, 'not terminal', 1)
(2786, 472577, 'not terminal', 1)
(2827, 355343, 'not terminal', 1)
(2840, 353396, 'not terminal', 1)
(2871, 352657, 'not terminal', 1)
(2879, 347831, 'not terminal', 2)
(2945, 180485, 'not terminal', 1)
(2949, 184828, 'not terminal', 1)
(2950, 181644, 'not terminal', 1)
(2958, 195881, 'not terminal', 2)
(2960, 195976, 'not terminal', 2)
(2970, 638861, 'not terminal', 1)
(2982, 639703, 'not terminal', 1)
(2990, 639036, 'not terminal', 1)
(2996, 648677, 'not terminal', 1)
(2997, 651274, 'not terminal', 1)
(3006, 646162, 'not terminal', 2)
(3094, 464210, 'not terminal', 1)
(3107, 463569, 'not terminal', 1)
(3170, 333608, 'not terminal', 1)
(3185, 335313, 'not terminal', 1)
(3197, 327838, 'not terminal', 2)
(3219, 165811, 'not terminal', 1)
(3243, 156909, 'not terminal', 1)
(3256, 160162, 'not terminal', 1)
(3257, 157310, 'not terminal', 1)
(3259, 161574, 'not terminal', 1)
(3291, 635365, 'not terminal', 1)
(3303, 51803, 'not terminal', 1)
(3429, 314488, 'not terminal', 1)
(3434, 314779, 'not terminal', 1)
(3489, 135822, 'not terminal', 1)
(3617, 448027, 'not terminal', 2)
(3688, 126180, 'not terminal', 1)
(3742, 524219, 'not terminal', 1)
(3778, 446380, 'not terminal', 1)
(3813, 290693, 'not terminal', 1)
(3839, 105353, 'not terminal', 1)
(3955, 280470, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
523224*t^9*D^4 + 5232240*t^9*D^3 - 613860*t^8*D^4 + 18312840*t^9*D^2 - 3150264*t^8*D^3 - 1988602*t^7*D^4 + 26161200*t^9*D - 3555084*t^8*D^2 - 12066324*t^7*D^3 - 1686083*t^6*D^4 + 12557376*t^9 + 2178696*t^8*D - 26351974*t^7*D^2 - 9185534*t^6*D^3 - 692473*t^5*D^4 + 3197376*t^8 - 24420684*t^7*D - 19335469*t^6*D^2 - 3153096*t^5*D^3 - 143210*t^4*D^4 - 8146432*t^7 - 18444514*t^6*D - 5766121*t^5*D^2 - 510410*t^4*D^3 - 10184*t^3*D^4 - 6608496*t^6 - 4911170*t^5*D - 672588*t^4*D^2 - 32906*t^3*D^3 + 1109*t^2*D^4 - 1606304*t^5 - 396784*t^4*D - 5048*t^3*D^2 - 1556*t^2*D^3 + 163*t*D^4 - 78760*t^4 + 15004*t^3*D + 2461*t^2*D^2 - 314*t*D^3 - 4*D^4 + 9128*t^3 + 1536*t^2*D + 7*t*D^2 + 4*D^3 + 320*t^2
================================================================================
Period sequence 37
First 10 period coefficients: [1, 0, 4, 12, 84, 360, 2380, 13440, 83860, 512400]
The PF operator has N=4, r=9
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(129, 519654, 'not terminal', 2)
(160, 430082, 'not terminal', 2)
(208, 255877, 'terminal', 3)
(209, 255871, 'terminal', 3)
(296, 429080, 'not terminal', 1)
(404, 255703, 'not terminal', 3)
(414, 62075, 'terminal', 3)
(469, 543566, 'not terminal', 1)
(586, 516712, 'not terminal', 2)
(691, 254713, 'not terminal', 2)
(706, 254720, 'not terminal', 2)
(793, 541695, 'not terminal', 1)
(827, 513250, 'not terminal', 1)
(852, 513119, 'not terminal', 1)
(919, 420898, 'not terminal', 1)
(945, 420883, 'not terminal', 1)
(1055, 253608, 'not terminal', 2)
(1221, 507608, 'not terminal', 1)
(1628, 500363, 'not terminal', 1)
(1840, 236250, 'not terminal', 1)
(2063, 491122, 'not terminal', 1)
(2537, 370613, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
2663936*t^9*D^4 + 19979520*t^9*D^3 + 12672*t^8*D^4 + 53278720*t^9*D^2 - 7308928*t^8*D^3 - 3124352*t^7*D^4 + 59938560*t^9*D - 32398432*t^8*D^2 - 27207488*t^7*D^3 - 1909472*t^6*D^4 + 23975424*t^9 - 45842720*t^8*D - 78356608*t^7*D^2 - 12940032*t^6*D^3 - 480240*t^5*D^4 - 20765888*t^8 - 93058240*t^7*D - 29923800*t^6*D^2 - 2086880*t^5*D^3 - 79112*t^4*D^4 - 38784768*t^7 - 29078632*t^6*D - 3215932*t^5*D^2 - 147080*t^4*D^3 + 1432*t^3*D^4 - 10250160*t^6 - 1970932*t^5*D - 23152*t^4*D^2 - 12616*t^3*D^3 + 2962*t^2*D^4 - 384344*t^5 + 191024*t^4*D + 14228*t^3*D^2 - 7374*t^2*D^3 + 113*t*D^4 + 116736*t^4 + 15624*t^3*D + 1706*t^2*D^2 - 226*t*D^3 - 9*D^4 + 5752*t^3 + 1152*t^2*D + 5*t*D^2 + 9*D^3 + 288*t^2
================================================================================
Period sequence 38
First 10 period coefficients: [1, 0, 10, 42, 414, 3300, 29890, 275940, 2608270, 25305000]
The PF operator has N=4, r=9
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(526, 516949, 'not terminal', 1)
(665, 425397, 'not terminal', 2)
(835, 513263, 'not terminal', 1)
(930, 420924, 'not terminal', 1)
(941, 420889, 'not terminal', 1)
(988, 420104, 'not terminal', 2)
(1036, 251685, 'not terminal', 1)
(1096, 674606, 'not terminal', 2)
(1300, 413028, 'not terminal', 1)
(1302, 413050, 'not terminal', 1)
(1303, 413245, 'not terminal', 1)
(1314, 413253, 'not terminal', 1)
(1405, 246251, 'not terminal', 1)
(1425, 246208, 'not terminal', 1)
(1454, 251060, 'not terminal', 2)
(1472, 672935, 'not terminal', 1)
(1482, 674214, 'not terminal', 2)
(1487, 674234, 'not terminal', 1)
(1495, 674209, 'not terminal', 2)
(1498, 674053, 'not terminal', 2)
(1515, 61943, 'not terminal', 2)
(1520, 61933, 'not terminal', 2)
(1522, 61941, 'not terminal', 2)
(1527, 1521, 'terminal', 2)
(1709, 402259, 'not terminal', 1)
(1745, 397635, 'not terminal', 2)
(1777, 236718, 'not terminal', 1)
(1807, 236580, 'not terminal', 1)
(1812, 236242, 'not terminal', 1)
(1814, 236280, 'not terminal', 1)
(1818, 236285, 'not terminal', 1)
(1835, 236594, 'not terminal', 1)
(1855, 245234, 'not terminal', 2)
(1867, 245168, 'not terminal', 2)
(1868, 245226, 'not terminal', 2)
(1891, 672641, 'not terminal', 1)
(1905, 672892, 'not terminal', 1)
(1926, 61811, 'not terminal', 1)
(1938, 61687, 'not terminal', 2)
(2033, 491391, 'not terminal', 1)
(2036, 491363, 'not terminal', 1)
(2047, 491549, 'not terminal', 1)
(2098, 388879, 'not terminal', 1)
(2139, 388485, 'not terminal', 1)
(2145, 387411, 'not terminal', 1)
(2147, 388435, 'not terminal', 1)
(2163, 385181, 'not terminal', 2)
(2181, 222882, 'not terminal', 1)
(2201, 220430, 'not terminal', 2)
(2215, 222534, 'not terminal', 1)
(2216, 222714, 'not terminal', 1)
(2219, 222606, 'not terminal', 1)
(2246, 222570, 'not terminal', 1)
(2250, 234668, 'not terminal', 2)
(2251, 231193, 'not terminal', 2)
(2276, 662810, 'not terminal', 1)
(2280, 662683, 'not terminal', 1)
(2285, 662754, 'not terminal', 1)
(2302, 669048, 'not terminal', 2)
(2306, 669080, 'not terminal', 1)
(2315, 669421, 'not terminal', 1)
(2317, 669420, 'not terminal', 1)
(2318, 669041, 'not terminal', 1)
(2324, 667195, 'not terminal', 2)
(2338, 61098, 'not terminal', 2)
(2343, 61081, 'not terminal', 2)
(2344, 61283, 'not terminal', 1)
(2351, 12607, 'not terminal', 1)
(2459, 372872, 'not terminal', 1)
(2489, 370548, 'not terminal', 1)
(2496, 370586, 'not terminal', 1)
(2505, 369255, 'not terminal', 1)
(2516, 370580, 'not terminal', 1)
(2557, 205281, 'not terminal', 1)
(2562, 205940, 'not terminal', 1)
(2586, 204255, 'not terminal', 1)
(2588, 205076, 'not terminal', 1)
(2614, 202520, 'not terminal', 1)
(2616, 205057, 'not terminal', 1)
(2618, 204551, 'not terminal', 1)
(2627, 215852, 'not terminal', 2)
(2651, 652700, 'not terminal', 1)
(2676, 662358, 'not terminal', 1)
(2684, 59845, 'not terminal', 1)
(2686, 60022, 'not terminal', 1)
(2786, 472577, 'not terminal', 1)
(2840, 353396, 'not terminal', 1)
(2842, 353023, 'not terminal', 1)
(2855, 353919, 'not terminal', 1)
(2871, 352657, 'not terminal', 1)
(2872, 351015, 'not terminal', 1)
(2878, 345920, 'not terminal', 2)
(2880, 342527, 'not terminal', 2)
(2894, 186242, 'not terminal', 1)
(2914, 186299, 'not terminal', 1)
(2945, 180485, 'not terminal', 1)
(2949, 184828, 'not terminal', 1)
(2950, 181644, 'not terminal', 1)
(2992, 639704, 'not terminal', 1)
(2997, 651274, 'not terminal', 1)
(3118, 463650, 'not terminal', 1)
(3119, 465572, 'not terminal', 1)
(3164, 333356, 'not terminal', 1)
(3171, 335194, 'not terminal', 1)
(3193, 334855, 'not terminal', 1)
(3211, 165945, 'not terminal', 1)
(3222, 165904, 'not terminal', 1)
(3245, 161494, 'not terminal', 1)
(3257, 157310, 'not terminal', 1)
(3259, 161574, 'not terminal', 1)
(3291, 635365, 'not terminal', 1)
(3303, 51803, 'not terminal', 1)
(3368, 456285, 'not terminal', 1)
(3433, 317608, 'not terminal', 1)
(3434, 314779, 'not terminal', 1)
(3437, 314493, 'not terminal', 1)
(3489, 135822, 'not terminal', 1)
(3497, 140568, 'not terminal', 1)
(3643, 299902, 'not terminal', 1)
(3690, 125261, 'not terminal', 1)
(3695, 118065, 'not terminal', 1)
(3770, 446324, 'not terminal', 1)
(3780, 445061, 'not terminal', 1)
(3839, 105353, 'not terminal', 1)
(3908, 441580, 'not terminal', 1)
(3912, 442325, 'not terminal', 1)
(3955, 280470, 'not terminal', 1)
(3960, 281524, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
17727940*t^9*D^4 + 177279400*t^9*D^3 + 47452732*t^8*D^4 + 620477900*t^9*D^2 + 400876912*t^8*D^3 + 51239477*t^7*D^4 + 886397000*t^9*D + 1218943172*t^8*D^2 + 363088702*t^7*D^3 + 28719434*t^6*D^4 + 425470560*t^9 + 1562482112*t^8*D + 958664473*t^7*D^2 + 169273876*t^6*D^3 + 8782543*t^5*D^4 + 696963120*t^8 + 1102964660*t^7*D + 384463114*t^6*D^2 + 42555106*t^5*D^3 + 1322684*t^4*D^4 + 456149412*t^7 + 392394560*t^6*D + 80112855*t^5*D^2 + 5281118*t^4*D^3 + 37187*t^3*D^4 + 148485888*t^6 + 69331328*t^5*D + 7132816*t^4*D^2 + 238966*t^3*D^3 - 13026*t^2*D^4 + 22881836*t^5 + 4318688*t^4*D + 3879*t^3*D^2 + 11442*t^2*D^3 - 995*t*D^4 + 928456*t^4 - 146332*t^3*D - 16030*t^2*D^2 + 2278*t*D^3 + 24*D^4 - 76072*t^3 - 9600*t^2*D - 35*t*D^2 - 24*D^3 - 1920*t^2
================================================================================
Period sequence 39
First 10 period coefficients: [1, 0, 16, 90, 1104, 11460, 133990, 1588860, 19463920, 242996040]
The PF operator has N=4, r=9
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1192, 507655, 'not terminal', 1)
(1281, 413304, 'not terminal', 1)
(1321, 413237, 'not terminal', 1)
(1322, 413239, 'not terminal', 1)
(1415, 246266, 'not terminal', 1)
(1658, 497552, 'not terminal', 2)
(1720, 402296, 'not terminal', 1)
(1789, 236721, 'not terminal', 1)
(1793, 236734, 'not terminal', 1)
(1820, 236194, 'not terminal', 1)
(1834, 236585, 'not terminal', 1)
(1877, 669486, 'not terminal', 1)
(2090, 388932, 'not terminal', 1)
(2150, 387291, 'not terminal', 1)
(2182, 223087, 'not terminal', 1)
(2199, 223110, 'not terminal', 1)
(2232, 222817, 'not terminal', 1)
(2233, 222548, 'not terminal', 1)
(2262, 234763, 'not terminal', 2)
(2291, 662798, 'not terminal', 1)
(2311, 669393, 'not terminal', 2)
(2335, 61320, 'not terminal', 1)
(2341, 61252, 'not terminal', 2)
(2352, 12598, 'not terminal', 2)
(2475, 372903, 'not terminal', 1)
(2523, 372117, 'not terminal', 1)
(2592, 205078, 'not terminal', 1)
(2597, 204737, 'not terminal', 1)
(2625, 219437, 'not terminal', 2)
(2630, 652784, 'not terminal', 1)
(2652, 652688, 'not terminal', 1)
(2655, 662536, 'not terminal', 1)
(2680, 59969, 'not terminal', 1)
(2687, 60017, 'not terminal', 1)
(2689, 60034, 'not terminal', 1)
(2692, 59993, 'not terminal', 1)
(2699, 12508, 'not terminal', 1)
(2703, 1514, 'not terminal', 1)
(2773, 471922, 'not terminal', 1)
(2828, 355133, 'not terminal', 1)
(2903, 186477, 'not terminal', 1)
(2911, 186035, 'not terminal', 1)
(2929, 181660, 'not terminal', 2)
(2931, 183533, 'not terminal', 1)
(2957, 195631, 'not terminal', 2)
(2971, 638863, 'not terminal', 1)
(2975, 639467, 'not terminal', 1)
(2976, 639040, 'not terminal', 1)
(2977, 639026, 'not terminal', 1)
(3020, 57255, 'not terminal', 1)
(3027, 56158, 'not terminal', 2)
(3032, 12194, 'not terminal', 1)
(3123, 459912, 'not terminal', 2)
(3158, 331666, 'not terminal', 1)
(3173, 333422, 'not terminal', 1)
(3207, 166026, 'not terminal', 1)
(3210, 165592, 'not terminal', 1)
(3251, 161989, 'not terminal', 1)
(3252, 161408, 'not terminal', 1)
(3260, 176483, 'not terminal', 2)
(3272, 624170, 'not terminal', 1)
(3285, 624136, 'not terminal', 1)
(3287, 637785, 'not terminal', 1)
(3288, 635393, 'not terminal', 1)
(3300, 51702, 'not terminal', 1)
(3310, 11035, 'not terminal', 1)
(3387, 453160, 'not terminal', 2)
(3416, 315922, 'not terminal', 1)
(3420, 314336, 'not terminal', 1)
(3471, 145029, 'not terminal', 1)
(3502, 152299, 'not terminal', 2)
(3520, 607864, 'not terminal', 1)
(3522, 606817, 'not terminal', 1)
(3523, 608687, 'not terminal', 1)
(3527, 619540, 'not terminal', 1)
(3538, 45767, 'not terminal', 1)
(3638, 306682, 'not terminal', 1)
(3649, 301133, 'not terminal', 1)
(3657, 299865, 'not terminal', 1)
(3662, 296153, 'not terminal', 2)
(3704, 592333, 'not terminal', 1)
(3704, 592333, 'not terminal', 1)
(3705, 591419, 'not terminal', 1)
(3806, 293348, 'not terminal', 1)
(3816, 291693, 'not terminal', 1)
(3837, 108179, 'not terminal', 1)
(3841, 102320, 'not terminal', 1)
(3920, 440627, 'not terminal', 2)
(4050, 273088, 'not terminal', 1)
(4211, 433064, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
8530544*t^9*D^4 + 85305440*t^9*D^3 + 7197384*t^8*D^4 + 298569040*t^9*D^2 + 70661088*t^8*D^3 - 775025*t^7*D^4 + 426527200*t^9*D + 244031928*t^8*D^2 + 7047786*t^7*D^3 - 3089351*t^6*D^4 + 204733056*t^9 + 345428928*t^8*D + 49630835*t^7*D^2 - 11718242*t^6*D^3 - 1483142*t^5*D^4 + 164860704*t^8 + 87932628*t^7*D - 14659347*t^6*D^2 - 5440392*t^5*D^3 - 307603*t^4*D^4 + 46124604*t^7 - 5176588*t^6*D - 8161898*t^5*D^2 - 963588*t^4*D^3 - 22370*t^3*D^4 + 853868*t^6 - 5728116*t^5*D - 1139727*t^4*D^2 - 68010*t^3*D^3 + 1393*t^2*D^4 - 1531244*t^5 - 628424*t^4*D - 15678*t^3*D^2 - 2652*t^2*D^3 + 199*t*D^4 - 112296*t^4 + 18368*t^3*D + 3993*t^2*D^2 - 354*t*D^3 - 4*D^4 + 13104*t^3 + 2496*t^2*D + 11*t*D^2 + 4*D^3 + 512*t^2
================================================================================
Period sequence 40
First 10 period coefficients: [1, 0, 28, 216, 3516, 49680, 783640, 12594960, 208898620, 3533634720]
The PF operator has N=4, r=9
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1971, 545864, 'not terminal', 2)
(2092, 388964, 'not terminal', 1)
(2130, 388625, 'not terminal', 2)
(2189, 223123, 'not terminal', 1)
(2409, 482426, 'not terminal', 1)
(2446, 479734, 'not terminal', 2)
(2745, 529101, 'not terminal', 2)
(2807, 469775, 'not terminal', 2)
(2887, 186783, 'not terminal', 1)
(2890, 186772, 'not terminal', 1)
(2896, 186640, 'not terminal', 1)
(2923, 186637, 'not terminal', 2)
(2927, 184657, 'not terminal', 2)
(2966, 639881, 'not terminal', 1)
(2968, 639889, 'not terminal', 1)
(2983, 639786, 'not terminal', 2)
(3007, 53123, 'not terminal', 1)
(3007, 53123, 'not terminal', 1)
(3011, 53112, 'not terminal', 1)
(3018, 57357, 'not terminal', 2)
(3031, 11582, 'not terminal', 1)
(3035, 12198, 'not terminal', 2)
(3131, 338235, 'not terminal', 1)
(3152, 335125, 'not terminal', 2)
(3208, 166302, 'not terminal', 1)
(3274, 624507, 'not terminal', 1)
(3338, 526791, 'not terminal', 1)
(3356, 458619, 'not terminal', 1)
(3361, 456569, 'not terminal', 2)
(3375, 456805, 'not terminal', 1)
(3386, 454052, 'not terminal', 2)
(3408, 321054, 'not terminal', 1)
(3472, 146294, 'not terminal', 1)
(3476, 146798, 'not terminal', 1)
(3480, 140115, 'not terminal', 2)
(3486, 142082, 'not terminal', 2)
(3511, 610605, 'not terminal', 1)
(3528, 41156, 'not terminal', 1)
(3528, 41156, 'not terminal', 1)
(3531, 40767, 'not terminal', 1)
(3541, 9091, 'not terminal', 1)
(3614, 447951, 'not terminal', 2)
(3616, 447729, 'not terminal', 2)
(3644, 299287, 'not terminal', 1)
(3702, 597551, 'not terminal', 1)
(3788, 443493, 'not terminal', 2)
(3801, 292681, 'not terminal', 1)
(3827, 112423, 'not terminal', 1)
(3850, 585038, 'not terminal', 1)
(3850, 585038, 'not terminal', 1)
(3853, 584967, 'not terminal', 1)
(3872, 28187, 'not terminal', 1)
(3913, 442583, 'not terminal', 1)
(3933, 283208, 'not terminal', 1)
(3938, 281831, 'not terminal', 1)
(3971, 94626, 'not terminal', 1)
(4001, 544711, 'not terminal', 2)
(4020, 522103, 'not terminal', 2)
(4071, 86196, 'not terminal', 1)
(4163, 434689, 'not terminal', 1)
(4164, 434819, 'not terminal', 1)
(4174, 264553, 'not terminal', 1)
(4263, 431653, 'not terminal', 1)
(4301, 520292, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
87040000*t^9*D^4 + 870400000*t^9*D^3 + 85888000*t^8*D^4 + 3046400000*t^9*D^2 + 779392000*t^8*D^3 + 27987200*t^7*D^4 + 4352000000*t^9*D + 2529152000*t^8*D^2 + 251430400*t^7*D^3 + 771200*t^6*D^4 + 2088960000*t^9 + 3420032000*t^8*D + 794137600*t^7*D^2 + 25678720*t^6*D^3 - 1653888*t^5*D^4 + 1584384000*t^8 + 1042208000*t^7*D + 97416640*t^6*D^2 - 3665856*t^5*D^3 - 395796*t^4*D^4 + 471513600*t^7 + 131255360*t^6*D - 1622960*t^5*D^2 - 1073676*t^4*D^3 - 29335*t^3*D^4 + 58746240*t^6 + 1876656*t^5*D - 1146248*t^4*D^2 - 77590*t^3*D^3 + 788*t^2*D^4 + 1456928*t^5 - 606192*t^4*D - 23095*t^3*D^2 - 2386*t^2*D^3 + 133*t*D^4 - 102880*t^4 + 10808*t^3*D + 3572*t^2*D^2 - 214*t*D^3 - 2*D^4 + 10672*t^3 + 2240*t^2*D + 9*t*D^2 + 2*D^3 + 448*t^2
================================================================================
Period sequence 41
First 10 period coefficients: [1, 0, 2, 12, 30, 120, 920, 3360, 16030, 99120]
The PF operator has N=4, r=9
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(24, 520135, 'smooth', 3)
(46, 520051, 'not terminal', 2)
(73, 430422, 'terminal', 3)
(365, 254877, 'not terminal', 2)
(468, 543552, 'not terminal', 1)
(532, 516898, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
2373120*t^9*D^4 + 26104320*t^9*D^3 + 1247424*t^8*D^4 + 97297920*t^9*D^2 + 16076544*t^8*D^3 - 1643264*t^7*D^4 + 144760320*t^9*D + 68516928*t^8*D^2 - 9742656*t^7*D^3 - 1523856*t^6*D^4 + 71193600*t^9 + 111726336*t^8*D - 17912000*t^7*D^2 - 9117696*t^6*D^3 - 427264*t^5*D^4 + 58038528*t^8 - 11214720*t^7*D - 19727600*t^6*D^2 - 2065936*t^5*D^3 - 36300*t^4*D^4 - 1402112*t^7 - 18411904*t^6*D - 3702032*t^5*D^2 - 144000*t^4*D^3 + 7376*t^3*D^4 - 6317696*t^6 - 2927072*t^5*D - 124372*t^4*D^2 - 10604*t^3*D^3 + 2629*t^2*D^4 - 869696*t^5 + 9840*t^4*D + 18860*t^3*D^2 - 5864*t^2*D^3 + 146*t*D^4 + 38864*t^4 + 21496*t^3*D + 1043*t^2*D^2 - 369*t*D^3 - 11*D^4 + 8336*t^3 + 704*t^2*D + 3*t*D^2 + 11*D^3 + 176*t^2
================================================================================
Period sequence 42
First 10 period coefficients: [1, 0, 4, 12, 36, 360, 940, 8400, 38500, 210000]
The PF operator has N=4, r=9
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(18, 544339, 'not terminal', 2)
(55, 520047, 'not terminal', 2)
(71, 430439, 'terminal', 2)
(105, 544019, 'not terminal', 2)
(130, 519646, 'not terminal', 2)
(170, 430083, 'not terminal', 2)
(203, 255737, 'terminal', 2)
(306, 429015, 'not terminal', 2)
(366, 254841, 'not terminal', 2)
(380, 254828, 'not terminal', 2)
(502, 543291, 'not terminal', 2)
(2388, 532180, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
350464*t^9*D^4 + 2628480*t^9*D^3 + 529692*t^8*D^4 + 7009280*t^9*D^2 + 4469230*t^8*D^3 - 455100*t^7*D^4 + 7885440*t^9*D + 12915886*t^8*D^2 - 1455284*t^7*D^3 - 601112*t^6*D^4 + 3154176*t^9 + 15408428*t^8*D - 2103820*t^7*D^2 - 1205456*t^6*D^3 - 42389*t^5*D^4 + 6432080*t^8 - 1679060*t^7*D + 1574080*t^6*D^2 + 145491*t^5*D^3 - 89532*t^4*D^4 - 575424*t^7 + 4912464*t^6*D + 560112*t^5*D^2 - 605189*t^4*D^3 - 13017*t^3*D^4 + 2746176*t^6 + 434472*t^5*D - 1177117*t^4*D^2 - 48858*t^3*D^3 + 1514*t^2*D^4 + 80000*t^5 - 1014848*t^4*D - 5485*t^3*D^2 + 4166*t^2*D^3 + 584*t*D^4 - 319968*t^4 + 29152*t^3*D + 3792*t^2*D^2 - 1308*t*D^3 - 20*D^4 + 17376*t^3 + 2560*t^2*D + 4*t*D^2 + 20*D^3 + 640*t^2
================================================================================
Period sequence 43
First 10 period coefficients: [1, 0, 8, 12, 168, 600, 5300, 27720, 210280, 1308720]
The PF operator has N=4, r=9
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(113, 544028, 'not terminal', 2)
(149, 519311, 'not terminal', 3)
(194, 430360, 'not terminal', 4)
(218, 255779, 'smooth', 5)
(483, 543309, 'not terminal', 2)
(558, 516371, 'not terminal', 2)
(674, 427168, 'not terminal', 3)
(724, 254603, 'not terminal', 3)
(793, 541695, 'not terminal', 1)
(852, 513119, 'not terminal', 1)
(1466, 250714, 'not terminal', 2)
(2153, 387094, 'not terminal', 1)
Maximum Picard rank: 5; minimum Picard rank: 1
The PF operator for this sequence is:
1510400*t^9*D^4 + 11328000*t^9*D^3 + 1815680*t^8*D^4 + 30208000*t^9*D^2 + 9750400*t^8*D^3 + 704000*t^7*D^4 + 33984000*t^9*D + 19383200*t^8*D^2 + 6097760*t^7*D^3 + 432136*t^6*D^4 + 13593600*t^9 + 17132000*t^8*D + 18388720*t^7*D^2 + 4072992*t^6*D^3 - 10844*t^5*D^4 + 5683520*t^8 + 22699440*t^7*D + 10285044*t^6*D^2 + 102584*t^5*D^3 - 48149*t^4*D^4 + 9704480*t^7 + 10443988*t^6*D + 367272*t^5*D^2 - 125978*t^4*D^3 - 3001*t^3*D^4 + 3764600*t^6 + 464156*t^5*D - 61629*t^4*D^2 - 5370*t^3*D^3 + 926*t^2*D^4 + 204632*t^5 + 22488*t^4*D - 1411*t^3*D^2 - 1742*t^2*D^3 + 35*t*D^4 + 25736*t^4 + 400*t^3*D + 1018*t^2*D^2 - 49*t*D^3 - 3*D^4 + 536*t^3 + 720*t^2*D + 2*t*D^2 + 3*D^3 + 192*t^2
================================================================================
Period sequence 44
First 10 period coefficients: [1, 0, 2, 6, 6, 120, 110, 1260, 5110, 11760]
The PF operator has N=4, r=9
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(4, 544392, 'smooth', 2)
(23, 520154, 'terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
107730*t^9*D^4 + 1077300*t^9*D^3 - 211376*t^8*D^4 + 3770550*t^9*D^2 - 1957720*t^8*D^3 - 50139*t^7*D^4 + 5386500*t^9*D - 6461920*t^8*D^2 - 1018980*t^7*D^3 + 156996*t^6*D^4 + 2585520*t^9 - 8852360*t^8*D - 5313195*t^7*D^2 + 1635438*t^6*D^3 - 20520*t^5*D^4 - 4136784*t^8 - 9558810*t^7*D + 5706902*t^6*D^2 - 214704*t^5*D^3 + 16194*t^4*D^4 - 5214456*t^7 + 7947356*t^6*D - 759456*t^5*D^2 + 70185*t^4*D^3 + 1782*t^3*D^4 + 3718896*t^6 - 1059696*t^5*D + 107181*t^4*D^2 - 2106*t^3*D^3 - 448*t^2*D^4 - 494208*t^5 + 62406*t^4*D - 13608*t^3*D^2 - 224*t^2*D^3 - 243*t*D^4 + 9216*t^4 - 18792*t^3*D - 1024*t^2*D^2 + 729*t*D^3 + 24*D^4 - 7776*t^3 - 384*t^2*D - 48*D^3
================================================================================
Period sequence 45
First 10 period coefficients: [1, 0, 56, 492, 10536, 168600, 3180980, 58753800, 1129788520, 21955158960]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(768, 546850, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
140765405184*t^10*D^4 + 1407654051840*t^10*D^3 + 140951971840*t^9*D^4 + 4926789181440*t^10*D^2 + 1228313793536*t^9*D^3 + 61021975680*t^8*D^4 + 7038270259200*t^10*D + 3846083465216*t^9*D^2 + 488956014720*t^8*D^3 + 14481221760*t^7*D^4 + 3378369724416*t^10 + 5054333418496*t^9*D + 1447608623328*t^8*D^2 + 110773873632*t^7*D^3 + 1813042296*t^6*D^4 + 2295611774976*t^9 + 1835463402144*t^8*D + 308852302064*t^7*D^2 + 13471331328*t^6*D^3 + 64583364*t^5*D^4 + 815788817856*t^8 + 368497404080*t^7*D + 33715086372*t^6*D^2 + 623681400*t^5*D^3 - 9065133*t^4*D^4 + 155937753888*t^7 + 35918603028*t^6*D + 1393737480*t^5*D^2 - 15859242*t^4*D^3 - 736825*t^3*D^4 + 13821279480*t^6 + 1256041980*t^5*D - 13071861*t^4*D^2 - 1767242*t^3*D^3 + 14670*t^2*D^4 + 418487832*t^5 - 13904424*t^4*D - 1059187*t^3*D^2 - 38718*t^2*D^3 + 1491*t*D^4 - 4980024*t^4 - 625200*t^3*D + 65322*t^2*D^2 - 1281*t*D^3 - 27*D^4 - 81000*t^3 + 47952*t^2*D + 162*t*D^2 + 27*D^3 + 12096*t^2
================================================================================
Period sequence 46
First 10 period coefficients: [1, 0, 8, 36, 288, 2220, 18260, 154560, 1348480, 11977560]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(618, 425458, 'not terminal', 1)
(654, 425396, 'not terminal', 2)
(700, 61969, 'not terminal', 2)
(920, 420919, 'not terminal', 1)
(921, 420848, 'not terminal', 1)
(939, 420918, 'not terminal', 1)
(1017, 251657, 'not terminal', 1)
(1022, 251663, 'not terminal', 1)
(1029, 251686, 'not terminal', 1)
(1063, 253844, 'not terminal', 2)
(1088, 674629, 'not terminal', 1)
(1097, 674602, 'not terminal', 2)
(1098, 674610, 'not terminal', 2)
(1109, 61964, 'terminal', 2)
(1111, 61966, 'terminal', 2)
(1185, 507329, 'not terminal', 1)
(1297, 413170, 'not terminal', 1)
(1319, 413255, 'not terminal', 1)
(1363, 409707, 'not terminal', 2)
(1408, 246247, 'not terminal', 1)
(1422, 246217, 'not terminal', 1)
(1437, 251061, 'not terminal', 2)
(1452, 251469, 'not terminal', 2)
(1457, 251490, 'not terminal', 2)
(1469, 251478, 'not terminal', 2)
(1478, 674217, 'not terminal', 1)
(1486, 674222, 'not terminal', 1)
(1494, 674224, 'not terminal', 1)
(1501, 674057, 'not terminal', 2)
(1510, 674145, 'not terminal', 2)
(1512, 674047, 'not terminal', 2)
(1524, 61929, 'not terminal', 2)
(1633, 500125, 'not terminal', 1)
(1704, 402420, 'not terminal', 1)
(1723, 402265, 'not terminal', 1)
(1754, 400122, 'not terminal', 2)
(1794, 236254, 'not terminal', 1)
(1799, 236106, 'not terminal', 1)
(1803, 236389, 'not terminal', 1)
(1806, 236322, 'not terminal', 1)
(1810, 236286, 'not terminal', 1)
(1830, 236259, 'not terminal', 1)
(1880, 672834, 'not terminal', 1)
(1890, 672704, 'not terminal', 1)
(1894, 672796, 'not terminal', 1)
(1895, 672899, 'not terminal', 1)
(1896, 672736, 'not terminal', 1)
(1904, 672916, 'not terminal', 1)
(1909, 671849, 'not terminal', 2)
(1916, 672378, 'not terminal', 2)
(1927, 61752, 'not terminal', 1)
(1935, 61793, 'not terminal', 1)
(1940, 12636, 'not terminal', 1)
(2121, 387412, 'not terminal', 1)
(2138, 387402, 'not terminal', 1)
(2141, 387300, 'not terminal', 1)
(2177, 382876, 'not terminal', 2)
(2208, 222568, 'not terminal', 1)
(2214, 222458, 'not terminal', 1)
(2237, 222726, 'not terminal', 1)
(2248, 222623, 'not terminal', 1)
(2260, 234737, 'not terminal', 2)
(2266, 234529, 'not terminal', 2)
(2275, 662648, 'not terminal', 1)
(2305, 668857, 'not terminal', 1)
(2307, 668969, 'not terminal', 1)
(2322, 667189, 'not terminal', 2)
(2434, 481361, 'not terminal', 1)
(2495, 370863, 'not terminal', 1)
(2506, 370605, 'not terminal', 1)
(2542, 364763, 'not terminal', 2)
(2580, 203196, 'not terminal', 1)
(2583, 204801, 'not terminal', 1)
(2585, 202543, 'not terminal', 1)
(2587, 205060, 'not terminal', 1)
(2611, 202529, 'not terminal', 1)
(2613, 205079, 'not terminal', 1)
(2615, 202546, 'not terminal', 1)
(2623, 215827, 'not terminal', 2)
(2629, 219188, 'not terminal', 2)
(2650, 652478, 'not terminal', 1)
(2667, 662367, 'not terminal', 1)
(2672, 660322, 'not terminal', 1)
(2673, 660594, 'not terminal', 1)
(2675, 662247, 'not terminal', 1)
(2694, 59490, 'not terminal', 1)
(2850, 352406, 'not terminal', 1)
(2853, 352835, 'not terminal', 1)
(2868, 353584, 'not terminal', 1)
(2912, 186243, 'not terminal', 1)
(2944, 179896, 'not terminal', 1)
(2956, 181640, 'not terminal', 1)
(3004, 651989, 'not terminal', 1)
(3105, 463440, 'not terminal', 1)
(3124, 460154, 'not terminal', 2)
(3144, 337513, 'not terminal', 1)
(3172, 331225, 'not terminal', 1)
(3182, 335518, 'not terminal', 1)
(3184, 334949, 'not terminal', 1)
(3187, 331189, 'not terminal', 1)
(3198, 327875, 'not terminal', 2)
(3258, 162003, 'not terminal', 1)
(3432, 315929, 'not terminal', 1)
(3490, 134595, 'not terminal', 1)
(3491, 134607, 'not terminal', 1)
(3496, 140565, 'not terminal', 1)
(3501, 136423, 'not terminal', 1)
(3589, 451154, 'not terminal', 1)
(3652, 299833, 'not terminal', 1)
(3660, 299797, 'not terminal', 1)
(3786, 446194, 'not terminal', 1)
(3821, 287278, 'not terminal', 1)
(4039, 438565, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
15251013*t^10*D^4 + 152510130*t^10*D^3 + 76520485*t^9*D^4 + 533785455*t^10*D^2 + 759752066*t^9*D^3 + 117642520*t^8*D^4 + 762550650*t^10*D + 2645500271*t^9*D^2 + 1028775408*t^8*D^3 + 88160926*t^7*D^4 + 366024312*t^10 + 3766043626*t^9*D + 3195245200*t^8*D^2 + 646638706*t^7*D^3 + 36819936*t^6*D^4 + 1803774936*t^9 + 4148945544*t^8*D + 1722212768*t^7*D^2 + 216212346*t^6*D^3 + 8698884*t^5*D^4 + 1864833232*t^8 + 1975038476*t^7*D + 473750284*t^6*D^2 + 38703964*t^5*D^3 + 989458*t^4*D^4 + 811303488*t^7 + 460695886*t^6*D + 64810856*t^5*D^2 + 3411340*t^4*D^3 - 9642*t^3*D^4 + 166315192*t^6 + 48792278*t^5*D + 3356100*t^4*D^2 + 179268*t^3*D^3 - 14033*t^2*D^4 + 13882456*t^5 + 1076112*t^4*D - 83340*t^3*D^2 + 25110*t^2*D^3 - 789*t*D^4 - 94496*t^4 - 145388*t^3*D - 12903*t^2*D^2 + 1760*t*D^3 + 26*D^4 - 61072*t^3 - 7904*t^2*D - 35*t*D^2 - 26*D^3 - 1664*t^2
================================================================================
Period sequence 47
First 10 period coefficients: [1, 0, 6, 12, 114, 540, 3480, 22680, 137970, 978600]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(162, 430088, 'not terminal', 2)
(174, 430090, 'not terminal', 2)
(201, 255741, 'terminal', 2)
(386, 254880, 'not terminal', 2)
(387, 254886, 'not terminal', 2)
(412, 62088, 'terminal', 2)
(480, 543000, 'not terminal', 2)
(541, 516953, 'not terminal', 1)
(553, 516413, 'not terminal', 2)
(615, 425450, 'not terminal', 1)
(645, 425296, 'not terminal', 2)
(710, 254688, 'not terminal', 2)
(733, 674683, 'terminal', 2)
(956, 420092, 'not terminal', 2)
(995, 420102, 'not terminal', 2)
(1030, 251644, 'not terminal', 1)
(1033, 251670, 'not terminal', 1)
(1075, 253971, 'not terminal', 2)
(1262, 505556, 'not terminal', 2)
(1335, 413140, 'not terminal', 1)
(1406, 246234, 'not terminal', 1)
(1433, 250966, 'not terminal', 2)
(1734, 402413, 'not terminal', 1)
(1757, 397770, 'not terminal', 2)
(2230, 222362, 'not terminal', 1)
(2788, 472024, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
508905*t^10*D^4 + 5089050*t^10*D^3 + 3256697*t^9*D^4 + 17811675*t^10*D^2 + 25468042*t^9*D^3 + 6847325*t^8*D^4 + 25445250*t^10*D + 71390827*t^9*D^2 + 40398830*t^8*D^3 + 6581020*t^7*D^4 + 12213720*t^10 + 84746642*t^9*D + 88267483*t^8*D^2 + 26830932*t^7*D^3 + 2419910*t^6*D^4 + 35567160*t^9 + 84720514*t^8*D + 40292576*t^7*D^2 + 4552156*t^6*D^3 - 242379*t^5*D^4 + 30004536*t^8 + 24910440*t^7*D - 5259302*t^6*D^2 - 3992160*t^5*D^3 - 445503*t^4*D^4 + 4867776*t^7 - 16572868*t^6*D - 13113665*t^5*D^2 - 2133828*t^4*D^3 - 64359*t^3*D^4 - 9218856*t^6 - 15293270*t^5*D - 4294451*t^4*D^2 - 104016*t^3*D^3 + 7006*t^2*D^4 - 6129312*t^5 - 3495012*t^4*D - 69449*t^3*D^2 + 10132*t^2*D^3 + 1307*t*D^4 - 1044144*t^4 + 58304*t^3*D + 10996*t^2*D^2 - 3090*t*D^3 - 34*D^4 + 44520*t^3 + 7072*t^2*D + 15*t*D^2 + 34*D^3 + 1632*t^2
================================================================================
Period sequence 48
First 10 period coefficients: [1, 0, 2, 12, 6, 180, 560, 1680, 16870, 46200]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(20, 520159, 'terminal', 2)
(45, 520058, 'not terminal', 2)
(69, 430433, 'terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
913731*t^10*D^4 + 9137310*t^10*D^3 + 5841702*t^9*D^4 + 31980585*t^10*D^2 + 48936156*t^9*D^3 + 8849727*t^8*D^4 + 45686550*t^10*D + 147574386*t^9*D^2 + 68576106*t^8*D^3 + 4137177*t^7*D^4 + 21929544*t^10 + 187795596*t^9*D + 187126041*t^8*D^2 + 18394668*t^7*D^3 + 1710763*t^6*D^4 + 83315664*t^9 + 214091286*t^8*D + 27410061*t^7*D^2 + 1053038*t^6*D^3 - 138236*t^5*D^4 + 86691624*t^8 + 13373970*t^7*D - 17357125*t^6*D^2 - 1891988*t^5*D^3 - 240654*t^4*D^4 + 221400*t^7 - 34592012*t^6*D - 5809234*t^5*D^2 - 949734*t^4*D^3 - 24605*t^3*D^4 - 17985000*t^6 - 6523600*t^5*D - 2005192*t^4*D^2 + 59234*t^3*D^3 + 3713*t^2*D^4 - 2533008*t^5 - 1625788*t^4*D + 33233*t^3*D^2 + 2420*t^2*D^3 + 1339*t*D^4 - 482664*t^4 + 73420*t^3*D + 4353*t^2*D^2 - 3000*t*D^3 - 46*D^4 + 34920*t^3 + 2944*t^2*D + 5*t*D^2 + 46*D^3 + 736*t^2
================================================================================
Period sequence 49
First 10 period coefficients: [1, 0, 90, 1518, 46086, 1327320, 41383350, 1329442380, 43944315030, 1483208104560]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(3926, 283519, 'not terminal', 1)
(3926, 283519, 'not terminal', 1)
(3963, 98325, 'not terminal', 1)
(4030, 437961, 'not terminal', 2)
(4055, 86711, 'not terminal', 1)
(4205, 433633, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
89512048353*t^10*D^4 + 895120483530*t^10*D^3 + 63367211306*t^9*D^4 + 3132921692355*t^10*D^2 + 602613194932*t^9*D^3 + 13790779450*t^8*D^4 + 4475602417650*t^10*D + 2031498886942*t^9*D^2 + 143098410028*t^8*D^3 - 749296777*t^7*D^4 + 2148289160472*t^10 + 2826712465892*t^9*D + 494883219656*t^8*D^2 + 8120611350*t^7*D^3 - 886430965*t^6*D^4 + 1334459562576*t^9 + 689822480522*t^8*D + 45684103321*t^7*D^2 - 2466160886*t^6*D^3 - 172996168*t^5*D^4 + 324246891444*t^8 + 72071251314*t^7*D - 1679627669*t^6*D^2 - 527077168*t^5*D^3 - 15459773*t^4*D^4 + 35257056120*t^7 + 959953520*t^6*D - 649917208*t^5*D^2 - 41638506*t^4*D^3 - 543404*t^3*D^4 + 1058102124*t^6 - 381439654*t^5*D - 40129157*t^4*D^2 - 1427821*t^3*D^3 + 7306*t^2*D^4 - 80086260*t^5 - 20032320*t^4*D - 163059*t^3*D^2 - 28190*t^2*D^3 + 677*t*D^4 - 3019536*t^4 + 303756*t^3*D + 35862*t^2*D^2 - 1074*t*D^3 - 5*D^4 + 187740*t^3 + 21120*t^2*D + 57*t*D^2 + 5*D^3 + 3600*t^2
================================================================================
Period sequence 50
First 10 period coefficients: [1, 0, 6, 24, 138, 1080, 6540, 50400, 362250, 2713200]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(372, 254885, 'not terminal', 2)
(388, 254888, 'not terminal', 2)
(413, 62091, 'terminal', 2)
(546, 516490, 'not terminal', 2)
(696, 61980, 'not terminal', 2)
(713, 61976, 'not terminal', 2)
(728, 674686, 'terminal', 2)
(830, 513201, 'not terminal', 1)
(869, 511652, 'not terminal', 2)
(925, 420902, 'not terminal', 1)
(954, 420357, 'not terminal', 2)
(1045, 253900, 'not terminal', 2)
(1053, 253821, 'not terminal', 2)
(1064, 253824, 'not terminal', 2)
(1086, 674621, 'not terminal', 1)
(1093, 674579, 'not terminal', 2)
(1100, 674599, 'not terminal', 2)
(1186, 507588, 'not terminal', 1)
(1371, 412178, 'not terminal', 2)
(1387, 246285, 'not terminal', 1)
(1400, 246081, 'not terminal', 1)
(1439, 251444, 'not terminal', 2)
(1446, 251085, 'not terminal', 2)
(1492, 674206, 'not terminal', 1)
(1629, 500365, 'not terminal', 1)
(1671, 498770, 'not terminal', 2)
(1748, 397686, 'not terminal', 2)
(1801, 236235, 'not terminal', 1)
(1811, 236421, 'not terminal', 1)
(1851, 236231, 'not terminal', 1)
(1852, 236551, 'not terminal', 1)
(1853, 236555, 'not terminal', 1)
(1856, 245021, 'not terminal', 2)
(1933, 61769, 'not terminal', 1)
(2029, 491204, 'not terminal', 1)
(2030, 490916, 'not terminal', 1)
(2157, 387964, 'not terminal', 1)
(2171, 382866, 'not terminal', 2)
(2191, 223129, 'not terminal', 1)
(2316, 668872, 'not terminal', 1)
(2430, 482432, 'not terminal', 1)
(2442, 481366, 'not terminal', 1)
(2449, 479159, 'not terminal', 2)
(2528, 372132, 'not terminal', 1)
(2610, 202555, 'not terminal', 1)
(2859, 353579, 'not terminal', 1)
(2877, 352788, 'not terminal', 1)
(3188, 332295, 'not terminal', 1)
(3189, 334947, 'not terminal', 1)
(3610, 450159, 'not terminal', 1)
(3787, 446396, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
1344000*t^10*D^4 + 13440000*t^10*D^3 - 1433600*t^9*D^4 + 47040000*t^10*D^2 - 25648000*t^9*D^3 - 9758720*t^8*D^4 + 67200000*t^10*D - 118048000*t^9*D^2 - 101534400*t^8*D^3 - 13216960*t^7*D^4 + 32256000*t^10 - 196112000*t^9*D - 347468800*t^8*D^2 - 107367840*t^7*D^3 - 8272672*t^6*D^4 - 102278400*t^9 - 478046400*t^8*D - 303959360*t^7*D^2 - 53144224*t^6*D^3 - 2614400*t^5*D^4 - 222353280*t^8 - 363136800*t^7*D - 124725968*t^6*D^2 - 13162952*t^5*D^3 - 360736*t^4*D^4 - 153328320*t^7 - 128125136*t^6*D - 24902616*t^5*D^2 - 1455100*t^4*D^3 + 4340*t^3*D^4 - 48306720*t^6 - 21057888*t^5*D - 1967380*t^4*D^2 - 54558*t^3*D^3 + 6580*t^2*D^4 - 6741504*t^5 - 1099296*t^4*D + 24982*t^3*D^2 - 7812*t^2*D^3 + 462*t*D^4 - 200736*t^4 + 64092*t^3*D + 5456*t^2*D^2 - 1134*t*D^3 - 15*D^4 + 29232*t^3 + 3360*t^2*D + 12*t*D^2 + 15*D^3 + 720*t^2
================================================================================
Period sequence 51
First 10 period coefficients: [1, 0, 36, 348, 6516, 110880, 2069820, 39606000, 780530100, 15697106880]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2471, 372935, 'not terminal', 1)
(2553, 205994, 'not terminal', 1)
(2753, 474441, 'not terminal', 1)
(2965, 639875, 'not terminal', 1)
(3101, 464112, 'not terminal', 2)
(3132, 338167, 'not terminal', 1)
(3214, 166515, 'not terminal', 1)
(3215, 166501, 'not terminal', 1)
(3238, 163386, 'not terminal', 2)
(3265, 625365, 'not terminal', 1)
(3447, 147436, 'not terminal', 1)
(3483, 140735, 'not terminal', 2)
(3508, 610744, 'not terminal', 1)
(3510, 610784, 'not terminal', 1)
(3529, 41168, 'not terminal', 1)
(3536, 41127, 'not terminal', 1)
(3542, 9094, 'not terminal', 1)
(3543, 9098, 'not terminal', 1)
(3591, 449870, 'not terminal', 1)
(3623, 306022, 'not terminal', 1)
(3628, 305762, 'not terminal', 1)
(3640, 301937, 'not terminal', 2)
(3697, 597527, 'not terminal', 1)
(3700, 597556, 'not terminal', 1)
(3703, 597738, 'not terminal', 1)
(3717, 34551, 'not terminal', 1)
(3812, 287299, 'not terminal', 2)
(3823, 112305, 'not terminal', 1)
(3831, 108038, 'not terminal', 1)
(3846, 585232, 'not terminal', 1)
(3855, 584997, 'not terminal', 1)
(3866, 29610, 'not terminal', 1)
(3870, 28930, 'not terminal', 1)
(3928, 282712, 'not terminal', 1)
(3946, 283322, 'not terminal', 1)
(3962, 98196, 'not terminal', 1)
(3975, 94624, 'not terminal', 1)
(3976, 95280, 'not terminal', 1)
(4060, 87169, 'not terminal', 1)
(4061, 82704, 'not terminal', 1)
(4078, 565273, 'not terminal', 1)
(4100, 521707, 'not terminal', 2)
(4125, 268804, 'not terminal', 1)
(4135, 77741, 'not terminal', 1)
(4137, 76994, 'not terminal', 1)
(4208, 433608, 'not terminal', 1)
(4220, 261600, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
960993600*t^10*D^4 + 9609936000*t^10*D^3 + 559184640*t^9*D^4 + 33634776000*t^10*D^2 + 6146485800*t^9*D^3 - 286630276*t^8*D^4 + 48049680000*t^10*D + 22899298800*t^9*D^2 - 638697930*t^8*D^3 - 380393772*t^7*D^4 + 23063846400*t^10 + 34060265400*t^9*D + 1909333486*t^8*D^2 - 1684575470*t^7*D^3 - 157746516*t^6*D^4 + 16748267760*t^9 + 5899431828*t^8*D - 2643610830*t^7*D^2 - 647447948*t^6*D^3 - 33565017*t^5*D^4 + 3638030688*t^8 - 1599664636*t^7*D - 1062133712*t^6*D^2 - 118273697*t^5*D^3 - 3714599*t^4*D^4 - 260235504*t^7 - 799487244*t^6*D - 170361496*t^5*D^2 - 11058369*t^4*D^3 - 149690*t^3*D^4 - 227085624*t^6 - 118040652*t^5*D - 11202202*t^4*D^2 - 493730*t^3*D^3 + 6766*t^2*D^4 - 31164120*t^5 - 5560248*t^4*D - 26278*t^3*D^2 - 15748*t^2*D^3 + 551*t*D^4 - 801576*t^4 + 150560*t^3*D + 18408*t^2*D^2 - 955*t*D^3 - 7*D^4 + 83448*t^3 + 10976*t^2*D + 40*t*D^2 + 7*D^3 + 2016*t^2
================================================================================
Period sequence 52
First 10 period coefficients: [1, 0, 14, 84, 930, 9720, 108680, 1259160, 14951650, 181377840]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1253, 506765, 'not terminal', 2)
(1347, 413085, 'not terminal', 1)
(1392, 246264, 'not terminal', 1)
(1414, 246260, 'not terminal', 1)
(1418, 246269, 'not terminal', 2)
(1429, 246223, 'not terminal', 1)
(1661, 498805, 'not terminal', 2)
(1679, 498737, 'not terminal', 2)
(1716, 401569, 'not terminal', 1)
(1756, 400558, 'not terminal', 2)
(1820, 236194, 'not terminal', 1)
(1823, 236588, 'not terminal', 1)
(1833, 236550, 'not terminal', 1)
(1873, 669485, 'not terminal', 1)
(1883, 672884, 'not terminal', 1)
(1923, 61815, 'not terminal', 1)
(1931, 61766, 'not terminal', 2)
(2112, 387295, 'not terminal', 1)
(2113, 388555, 'not terminal', 1)
(2151, 388570, 'not terminal', 1)
(2212, 222537, 'not terminal', 1)
(2220, 222519, 'not terminal', 1)
(2235, 222648, 'not terminal', 2)
(2252, 234667, 'not terminal', 2)
(2277, 662786, 'not terminal', 1)
(2289, 662706, 'not terminal', 1)
(2291, 662798, 'not terminal', 1)
(2294, 662747, 'not terminal', 1)
(2296, 662762, 'not terminal', 1)
(2299, 662797, 'not terminal', 1)
(2303, 669376, 'not terminal', 1)
(2331, 61352, 'not terminal', 2)
(2332, 61364, 'not terminal', 1)
(2335, 61320, 'not terminal', 1)
(2340, 61261, 'not terminal', 2)
(2342, 61055, 'not terminal', 2)
(2346, 61240, 'not terminal', 2)
(2353, 1520, 'not terminal', 2)
(2410, 482313, 'not terminal', 1)
(2433, 482128, 'not terminal', 1)
(2447, 479733, 'not terminal', 2)
(2482, 371917, 'not terminal', 1)
(2483, 370843, 'not terminal', 1)
(2484, 370581, 'not terminal', 1)
(2488, 368601, 'not terminal', 1)
(2563, 205576, 'not terminal', 1)
(2568, 205443, 'not terminal', 1)
(2592, 205078, 'not terminal', 1)
(2603, 204951, 'not terminal', 1)
(2635, 652672, 'not terminal', 1)
(2641, 652695, 'not terminal', 1)
(2643, 652681, 'not terminal', 1)
(2644, 652662, 'not terminal', 1)
(2648, 652706, 'not terminal', 1)
(2652, 652688, 'not terminal', 1)
(2653, 652715, 'not terminal', 1)
(2655, 662536, 'not terminal', 1)
(2666, 662510, 'not terminal', 1)
(2669, 662154, 'not terminal', 2)
(2671, 662129, 'not terminal', 1)
(2680, 59969, 'not terminal', 1)
(2687, 60017, 'not terminal', 1)
(2688, 60031, 'not terminal', 1)
(2689, 60034, 'not terminal', 1)
(2697, 12519, 'not terminal', 1)
(2699, 12508, 'not terminal', 1)
(2703, 1514, 'not terminal', 1)
(2759, 473302, 'not terminal', 1)
(2759, 473302, 'not terminal', 1)
(2769, 473155, 'not terminal', 1)
(2773, 471922, 'not terminal', 1)
(2854, 352704, 'not terminal', 1)
(2858, 352783, 'not terminal', 1)
(2881, 347781, 'not terminal', 2)
(2885, 186731, 'not terminal', 1)
(2892, 186241, 'not terminal', 1)
(2903, 186477, 'not terminal', 1)
(2915, 186256, 'not terminal', 1)
(2930, 181753, 'not terminal', 2)
(2931, 183533, 'not terminal', 1)
(2937, 181441, 'not terminal', 1)
(2938, 184165, 'not terminal', 1)
(2939, 178124, 'not terminal', 2)
(2953, 181769, 'not terminal', 1)
(2954, 181697, 'not terminal', 1)
(2971, 638863, 'not terminal', 1)
(2974, 639652, 'not terminal', 1)
(2976, 639040, 'not terminal', 1)
(2978, 639673, 'not terminal', 1)
(2980, 639783, 'not terminal', 1)
(2985, 639042, 'not terminal', 1)
(2993, 639761, 'not terminal', 1)
(2994, 651661, 'not terminal', 2)
(3001, 651803, 'not terminal', 2)
(3009, 53121, 'not terminal', 1)
(3020, 57255, 'not terminal', 1)
(3030, 54918, 'not terminal', 2)
(3032, 12194, 'not terminal', 1)
(3091, 464388, 'not terminal', 1)
(3138, 337781, 'not terminal', 1)
(3157, 335307, 'not terminal', 1)
(3158, 331666, 'not terminal', 1)
(3163, 331116, 'not terminal', 1)
(3173, 333422, 'not terminal', 1)
(3175, 335193, 'not terminal', 1)
(3196, 327940, 'not terminal', 2)
(3206, 165903, 'not terminal', 1)
(3207, 166026, 'not terminal', 1)
(3250, 163422, 'not terminal', 1)
(3252, 161408, 'not terminal', 1)
(3255, 161488, 'not terminal', 1)
(3270, 623294, 'not terminal', 1)
(3285, 624136, 'not terminal', 1)
(3287, 637785, 'not terminal', 1)
(3288, 635393, 'not terminal', 1)
(3294, 47421, 'not terminal', 1)
(3300, 51702, 'not terminal', 1)
(3302, 52267, 'not terminal', 1)
(3310, 11035, 'not terminal', 1)
(3352, 458617, 'not terminal', 1)
(3421, 317606, 'not terminal', 1)
(3439, 315731, 'not terminal', 1)
(3443, 308301, 'not terminal', 2)
(3453, 144213, 'not terminal', 1)
(3457, 146344, 'not terminal', 1)
(3467, 146348, 'not terminal', 1)
(3477, 145166, 'not terminal', 1)
(3481, 140254, 'not terminal', 1)
(3484, 136440, 'not terminal', 1)
(3494, 134327, 'not terminal', 1)
(3500, 140258, 'not terminal', 1)
(3509, 610612, 'not terminal', 1)
(3520, 607864, 'not terminal', 1)
(3522, 606817, 'not terminal', 1)
(3523, 608687, 'not terminal', 1)
(3524, 608931, 'not terminal', 1)
(3527, 619540, 'not terminal', 1)
(3538, 45767, 'not terminal', 1)
(3539, 45839, 'not terminal', 1)
(3556, 525382, 'not terminal', 1)
(3590, 450075, 'not terminal', 1)
(3590, 450075, 'not terminal', 1)
(3599, 451769, 'not terminal', 1)
(3615, 448025, 'not terminal', 2)
(3648, 304635, 'not terminal', 1)
(3649, 301133, 'not terminal', 1)
(3653, 299581, 'not terminal', 1)
(3657, 299865, 'not terminal', 1)
(3661, 300046, 'not terminal', 1)
(3668, 125301, 'not terminal', 1)
(3672, 126033, 'not terminal', 1)
(3676, 125177, 'not terminal', 1)
(3693, 120965, 'not terminal', 1)
(3704, 592333, 'not terminal', 1)
(3705, 591419, 'not terminal', 1)
(3707, 595050, 'not terminal', 1)
(3806, 293348, 'not terminal', 1)
(3820, 287137, 'not terminal', 1)
(3837, 108179, 'not terminal', 1)
(3841, 102320, 'not terminal', 1)
(3860, 580376, 'not terminal', 1)
(3862, 580301, 'not terminal', 1)
(3940, 282906, 'not terminal', 1)
(3956, 278176, 'not terminal', 1)
(3977, 93838, 'not terminal', 1)
(3979, 91442, 'not terminal', 1)
(4010, 522634, 'not terminal', 1)
(4034, 439128, 'not terminal', 1)
(4050, 273088, 'not terminal', 1)
(4070, 86235, 'not terminal', 1)
(4107, 436417, 'not terminal', 1)
(4176, 262193, 'not terminal', 1)
(4211, 433064, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
90261504*t^10*D^4 + 902615040*t^10*D^3 + 236743752*t^9*D^4 + 3159152640*t^10*D^2 + 2144264472*t^9*D^3 + 259615220*t^8*D^4 + 4513075200*t^10*D + 6946993032*t^9*D^2 + 2073260650*t^8*D^3 + 155044836*t^7*D^4 + 2166276096*t^10 + 9382284072*t^9*D + 6051505626*t^8*D^2 + 1060639312*t^7*D^3 + 54635248*t^6*D^4 + 4342811760*t^9 + 7535920628*t^8*D + 2717127360*t^7*D^2 + 309539216*t^6*D^3 + 11297833*t^5*D^4 + 3298060432*t^8 + 3049979172*t^7*D + 672908964*t^6*D^2 + 51118901*t^5*D^3 + 1199694*t^4*D^4 + 1238446288*t^7 + 659592852*t^6*D + 88743552*t^5*D^2 + 4382537*t^4*D^3 + 19655*t^3*D^4 + 241404104*t^6 + 71121244*t^5*D + 4984887*t^4*D^2 + 179974*t^3*D^3 - 7918*t^2*D^4 + 21853752*t^5 + 2470560*t^4*D - 33993*t^3*D^2 + 11686*t^2*D^3 - 474*t*D^4 + 360208*t^4 - 113664*t^3*D - 10092*t^2*D^2 + 1018*t*D^3 + 10*D^4 - 51856*t^3 - 5920*t^2*D - 24*t*D^2 - 10*D^3 - 1120*t^2
================================================================================
Period sequence 53
First 10 period coefficients: [1, 0, 2, 12, 6, 120, 560, 840, 10150, 38640]
The PF operator has N=4, r=10
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(19, 544340, 'not terminal', 2)
(27, 520139, 'smooth', 3)
Maximum Picard rank: 3; minimum Picard rank: 2
The PF operator for this sequence is:
75359232*t^10*D^4 + 753592320*t^10*D^3 + 76065792*t^9*D^4 + 2637573120*t^10*D^2 + 745423104*t^9*D^3 + 10353408*t^8*D^4 + 3767961600*t^10*D + 2570893824*t^9*D^2 + 185422464*t^8*D^3 - 14337920*t^7*D^4 + 1808621568*t^10 + 3635706624*t^9*D + 781251744*t^8*D^2 - 42224768*t^7*D^3 - 7537824*t^6*D^4 + 1734170112*t^9 + 1201099104*t^8*D + 12873488*t^7*D^2 - 31592736*t^6*D^3 - 1396752*t^5*D^4 + 594916416*t^8 + 126684080*t^7*D - 46659792*t^6*D^2 - 7117152*t^5*D^3 + 25576*t^4*D^4 + 85923744*t^7 - 26406192*t^6*D - 11117196*t^5*D^2 - 859856*t^4*D^3 + 55416*t^3*D^4 - 3739680*t^6 - 8508228*t^5*D - 483616*t^4*D^2 - 110028*t^3*D^3 + 8732*t^2*D^4 - 2480568*t^5 - 123472*t^4*D + 74296*t^3*D^2 - 15962*t^2*D^3 + 341*t*D^4 + 50928*t^4 + 85180*t^3*D + 3208*t^2*D^2 - 1228*t*D^3 - 39*D^4 + 33984*t^3 + 2288*t^2*D + 3*t*D^2 + 39*D^3 + 624*t^2
================================================================================
Period sequence 54
First 10 period coefficients: [1, 0, 0, 6, 24, 0, 90, 1260, 2520, 1680]
The PF operator has N=4, r=10
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(6, 544390, 'smooth', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
3907926*t^10*D^4 + 39079260*t^10*D^3 + 2152564*t^9*D^4 + 136777410*t^10*D^2 + 40334396*t^9*D^3 - 8420113*t^8*D^4 + 195396300*t^10*D + 188192276*t^9*D^2 - 49722312*t^8*D^3 - 9779556*t^7*D^4 + 93790224*t^10 + 314524516*t^9*D - 80928641*t^8*D^2 - 70490802*t^7*D^3 - 3272643*t^6*D^4 + 164514072*t^9 - 21031434*t^8*D - 184349706*t^7*D^2 - 20245680*t^6*D^3 - 300370*t^5*D^4 + 18595008*t^8 - 206673108*t^7*D - 44671005*t^6*D^2 - 1377859*t^5*D^3 + 55583*t^4*D^4 - 83034648*t^7 - 41585976*t^6*D - 1436319*t^5*D^2 + 27026*t^4*D^3 + 29236*t^3*D^4 - 13958100*t^6 + 167022*t^5*D + 308369*t^4*D^2 - 55638*t^3*D^3 + 6520*t^2*D^4 + 586008*t^5 + 382806*t^4*D + 26258*t^3*D^2 - 19917*t^2*D^3 - 78*t*D^4 + 167508*t^4 + 24786*t^3*D + 11*t^2*D^2 - 33*t*D^3 - 27*D^4 + 8748*t^3 + 3*t*D^2 + 27*D^3
================================================================================
Period sequence 55
First 10 period coefficients: [1, 0, 8, 30, 240, 1920, 13490, 121800, 953680, 8465520]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(337, 429050, 'not terminal', 2)
(567, 516491, 'not terminal', 2)
(690, 254018, 'not terminal', 2)
(927, 420895, 'not terminal', 1)
(951, 420907, 'not terminal', 1)
(1013, 251664, 'not terminal', 2)
(1108, 12649, 'terminal', 2)
(1229, 505549, 'not terminal', 2)
(1344, 413249, 'not terminal', 1)
(1368, 412180, 'not terminal', 2)
(1391, 246197, 'not terminal', 2)
(1413, 246229, 'not terminal', 1)
(1475, 672931, 'not terminal', 1)
(1489, 674218, 'not terminal', 2)
(1739, 402411, 'not terminal', 1)
(1761, 400230, 'not terminal', 2)
(1795, 236314, 'not terminal', 2)
(1816, 236554, 'not terminal', 1)
(1874, 669448, 'not terminal', 1)
(1876, 669474, 'not terminal', 1)
(2103, 388295, 'not terminal', 1)
(2108, 388579, 'not terminal', 1)
(2140, 387580, 'not terminal', 1)
(2172, 382503, 'not terminal', 2)
(2245, 222575, 'not terminal', 1)
(2249, 222443, 'not terminal', 1)
(2444, 477857, 'not terminal', 2)
(2532, 371689, 'not terminal', 1)
(2650, 652478, 'not terminal', 1)
(3168, 333898, 'not terminal', 1)
(3187, 331189, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
700447*t^10*D^4 + 7004470*t^10*D^3 + 3721502*t^9*D^4 + 24515645*t^10*D^2 + 33298724*t^9*D^3 + 8156240*t^8*D^4 + 35022350*t^10*D + 106754794*t^9*D^2 + 64369128*t^8*D^3 + 9533257*t^7*D^4 + 16810728*t^10 + 142995844*t^9*D + 186227290*t^8*D^2 + 65782326*t^7*D^3 + 6394193*t^6*D^4 + 65818272*t^9 + 230441574*t^8*D + 170297843*t^7*D^2 + 38459358*t^6*D^3 + 2434948*t^5*D^4 + 100427172*t^8 + 193166766*t^7*D + 88255865*t^6*D^2 + 12695856*t^5*D^3 + 460577*t^4*D^4 + 79117992*t^7 + 90580536*t^6*D + 25026212*t^5*D^2 + 2025642*t^4*D^3 + 16768*t^3*D^4 + 34381652*t^6 + 22286954*t^5*D + 3062113*t^4*D^2 + 83001*t^3*D^3 - 5500*t^2*D^4 + 7489484*t^5 + 2030560*t^4*D + 1867*t^3*D^2 + 2514*t^2*D^3 - 505*t*D^4 + 485016*t^4 - 63568*t^3*D - 6452*t^2*D^2 + 1192*t*D^3 + 13*D^4 - 32356*t^3 - 3952*t^2*D - 11*t*D^2 - 13*D^3 - 832*t^2
================================================================================
Period sequence 56
First 10 period coefficients: [1, 0, 14, 108, 1074, 13440, 154760, 1951320, 24999730, 325321920]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1700, 402368, 'not terminal', 2)
(1788, 236729, 'not terminal', 1)
(2202, 222698, 'not terminal', 2)
(2286, 662831, 'not terminal', 1)
(2326, 60046, 'not terminal', 1)
(2560, 205921, 'not terminal', 1)
(2678, 57390, 'not terminal', 1)
(2814, 468224, 'not terminal', 2)
(2899, 186540, 'not terminal', 1)
(2962, 639854, 'not terminal', 1)
(2972, 639684, 'not terminal', 1)
(3008, 53115, 'not terminal', 1)
(3204, 164775, 'not terminal', 1)
(3281, 624613, 'not terminal', 1)
(3394, 320563, 'not terminal', 1)
(3473, 146438, 'not terminal', 1)
(3670, 125848, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
354434952*t^10*D^4 + 3544349520*t^10*D^3 + 1120624580*t^9*D^4 + 12405223320*t^10*D^2 + 10347342424*t^9*D^3 + 1426075538*t^8*D^4 + 17721747600*t^10*D + 34068440044*t^9*D^2 + 11739128228*t^8*D^3 + 952354451*t^7*D^4 + 8506438848*t^10 + 46583291864*t^9*D + 35015744398*t^8*D^2 + 6794274222*t^7*D^3 + 360406745*t^6*D^4 + 21741569664*t^9 + 44264468668*t^8*D + 17873032677*t^7*D^2 + 2165775976*t^6*D^3 + 76656064*t^5*D^4 + 19561776960*t^8 + 20398647578*t^7*D + 4877875141*t^6*D^2 + 374640142*t^5*D^3 + 8107855*t^4*D^4 + 8367534672*t^7 + 4879071086*t^6*D + 686588800*t^5*D^2 + 31146402*t^4*D^3 + 169244*t^3*D^4 + 1806541296*t^6 + 567233422*t^5*D + 39586077*t^4*D^2 + 943174*t^3*D^3 - 42627*t^2*D^4 + 177965256*t^5 + 21058876*t^4*D - 298636*t^3*D^2 + 57006*t^2*D^3 - 2835*t*D^4 + 3511416*t^4 - 840288*t^3*D - 57009*t^2*D^2 + 6048*t*D^3 + 54*D^4 - 350712*t^3 - 33120*t^2*D - 117*t*D^2 - 54*D^3 - 6048*t^2
================================================================================
Period sequence 57
First 10 period coefficients: [1, 0, 2, 12, 54, 240, 1280, 7560, 42070, 235200]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(34, 544232, 'not terminal', 2)
(56, 519917, 'not terminal', 3)
(74, 430426, 'terminal', 3)
(163, 430073, 'not terminal', 2)
(205, 255862, 'terminal', 3)
(269, 518747, 'not terminal', 2)
(338, 428968, 'not terminal', 2)
(363, 254859, 'not terminal', 2)
(470, 543529, 'not terminal', 1)
(535, 516881, 'not terminal', 1)
(694, 254682, 'not terminal', 2)
(1040, 253880, 'not terminal', 2)
(1565, 537075, 'not terminal', 1)
(1701, 401730, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
14194688*t^10*D^4 + 141946880*t^10*D^3 - 20251136*t^9*D^4 + 496814080*t^10*D^2 - 267304448*t^9*D^3 - 37015168*t^8*D^4 + 709734400*t^10*D - 1097548288*t^9*D^2 - 372822784*t^8*D^3 - 20664768*t^7*D^4 + 340672512*t^10 - 1725280768*t^9*D - 1263547264*t^8*D^2 - 166199616*t^7*D^3 - 6141488*t^6*D^4 - 874785792*t^9 - 1736109824*t^8*D - 461232288*t^7*D^2 - 35961408*t^6*D^3 - 966392*t^5*D^4 - 808370176*t^8 - 533774176*t^7*D - 73716776*t^6*D^2 - 3810548*t^5*D^3 - 58800*t^4*D^4 - 218076736*t^7 - 62815880*t^6*D - 4327292*t^5*D^2 - 21588*t^4*D^3 + 19436*t^3*D^4 - 19109744*t^6 - 597136*t^5*D + 248244*t^4*D^2 - 57822*t^3*D^3 + 6638*t^2*D^4 + 826992*t^5 + 497272*t^4*D + 47762*t^3*D^2 - 18850*t^2*D^3 + 86*t*D^4 + 237200*t^4 + 39464*t^3*D + 1820*t^2*D^2 - 172*t*D^3 - 19*D^4 + 12232*t^3 + 1216*t^2*D + 10*t*D^2 + 19*D^3 + 304*t^2
================================================================================
Period sequence 58
First 10 period coefficients: [1, 0, 2, 0, 6, 60, 20, 840, 70, 7560]
The PF operator has N=4, r=10
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(7, 544387, 'smooth', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
3250399375*t^10*D^4 + 32503993750*t^10*D^3 - 3204170948*t^9*D^4 + 113763978125*t^10*D^2 - 31529317928*t^9*D^3 + 1187948800*t^8*D^4 + 162519968750*t^10*D - 109071633868*t^9*D^2 + 11449057600*t^8*D^3 - 143432111*t^7*D^4 + 78009585000*t^10 - 154572240328*t^9*D + 38988411800*t^8*D^2 - 1687146170*t^7*D^3 - 35253410*t^6*D^4 - 73825753440*t^9 + 54641064200*t^8*D - 5899848297*t^7*D^2 - 18722340*t^6*D^3 + 11285220*t^5*D^4 + 25913761200*t^8 - 8196454918*t^7*D + 218099170*t^6*D^2 + 52186598*t^5*D^3 + 1804017*t^4*D^4 - 3840320680*t^7 + 395087700*t^6*D + 38226776*t^5*D^2 - 14878378*t^4*D^3 - 1207644*t^3*D^4 + 193927960*t^6 + 11221080*t^5*D - 4421943*t^4*D^2 + 3221094*t^3*D^3 + 172828*t^2*D^4 - 1023568*t^5 - 113728*t^4*D + 47810*t^3*D^2 - 400366*t^2*D^3 - 5337*t*D^4 + 953120*t^4 - 95068*t^3*D + 24752*t^2*D^2 + 15014*t*D^3 - 310*D^4 - 69400*t^3 + 17856*t^2*D - 5*t*D^2 + 310*D^3 + 4960*t^2
================================================================================
Period sequence 59
First 10 period coefficients: [1, 0, 10, 60, 510, 4920, 47080, 473760, 4908190, 51641520]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(809, 541429, 'not terminal', 2)
(993, 420628, 'not terminal', 2)
(1015, 251683, 'not terminal', 2)
(1173, 539021, 'not terminal', 2)
(1232, 506525, 'not terminal', 2)
(1271, 413299, 'not terminal', 1)
(1417, 246243, 'not terminal', 1)
(1419, 246212, 'not terminal', 1)
(1463, 251055, 'not terminal', 2)
(1484, 674244, 'not terminal', 2)
(1519, 61942, 'not terminal', 2)
(1602, 500337, 'not terminal', 1)
(1668, 495904, 'not terminal', 2)
(1711, 402347, 'not terminal', 2)
(1763, 400195, 'not terminal', 2)
(1784, 236686, 'not terminal', 1)
(1817, 236578, 'not terminal', 1)
(1882, 672912, 'not terminal', 2)
(1903, 672908, 'not terminal', 2)
(1906, 672909, 'not terminal', 1)
(1907, 672880, 'not terminal', 2)
(1925, 61813, 'not terminal', 1)
(1939, 12641, 'not terminal', 2)
(1997, 533769, 'not terminal', 2)
(2088, 388953, 'not terminal', 1)
(2218, 222647, 'not terminal', 1)
(2258, 231184, 'not terminal', 2)
(2263, 234647, 'not terminal', 2)
(2272, 662846, 'not terminal', 1)
(2273, 662772, 'not terminal', 1)
(2283, 662809, 'not terminal', 1)
(2312, 669424, 'not terminal', 1)
(2330, 61357, 'not terminal', 1)
(2345, 61239, 'not terminal', 2)
(2348, 12613, 'not terminal', 1)
(2367, 532198, 'not terminal', 1)
(2372, 531930, 'not terminal', 1)
(2373, 532216, 'not terminal', 1)
(2418, 482199, 'not terminal', 1)
(2425, 481589, 'not terminal', 1)
(2445, 479727, 'not terminal', 2)
(2458, 372905, 'not terminal', 1)
(2485, 371631, 'not terminal', 1)
(2545, 364448, 'not terminal', 2)
(2589, 204381, 'not terminal', 1)
(2628, 219443, 'not terminal', 2)
(2631, 652808, 'not terminal', 1)
(2662, 662356, 'not terminal', 1)
(2668, 662326, 'not terminal', 1)
(2670, 662109, 'not terminal', 2)
(2685, 59847, 'not terminal', 1)
(2808, 469891, 'not terminal', 2)
(2821, 355506, 'not terminal', 1)
(2825, 354996, 'not terminal', 1)
(2891, 185547, 'not terminal', 1)
(2913, 186612, 'not terminal', 1)
(2951, 184238, 'not terminal', 1)
(2959, 194956, 'not terminal', 2)
(2973, 639032, 'not terminal', 1)
(2991, 638807, 'not terminal', 1)
(3016, 57186, 'not terminal', 1)
(3092, 464421, 'not terminal', 1)
(3195, 325509, 'not terminal', 2)
(3205, 166027, 'not terminal', 1)
(3221, 165882, 'not terminal', 1)
(3224, 165968, 'not terminal', 1)
(3233, 161602, 'not terminal', 1)
(3269, 622927, 'not terminal', 1)
(3333, 526321, 'not terminal', 1)
(3346, 525719, 'not terminal', 2)
(3362, 456388, 'not terminal', 1)
(3364, 456230, 'not terminal', 1)
(3425, 316454, 'not terminal', 1)
(3464, 146362, 'not terminal', 1)
(3629, 305845, 'not terminal', 1)
(3804, 292764, 'not terminal', 1)
(3906, 442435, 'not terminal', 1)
(3909, 442425, 'not terminal', 1)
(4154, 521439, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
20847360*t^10*D^4 + 208473600*t^10*D^3 + 89233408*t^9*D^4 + 729657600*t^10*D^2 + 871162368*t^9*D^3 + 128014592*t^8*D^4 + 1042368000*t^10*D + 2996139008*t^9*D^2 + 1108504448*t^8*D^3 + 89675392*t^7*D^4 + 500336640*t^10 + 4228781568*t^9*D + 3418219520*t^8*D^2 + 659811136*t^7*D^3 + 34511456*t^6*D^4 + 2014571520*t^9 + 4415346304*t^8*D + 1761941696*t^7*D^2 + 207337312*t^6*D^3 + 7392672*t^5*D^4 + 1977616640*t^8 + 2024369152*t^7*D + 462514336*t^6*D^2 + 34521872*t^5*D^3 + 771616*t^4*D^4 + 832563200*t^7 + 456112928*t^6*D + 60353584*t^5*D^2 + 2763864*t^4*D^3 + 3192*t^3*D^4 + 166441600*t^6 + 47409120*t^5*D + 3040416*t^4*D^2 + 108668*t^3*D^3 - 7257*t^2*D^4 + 14126720*t^5 + 1263832*t^4*D - 54044*t^3*D^2 + 12244*t^2*D^3 - 426*t*D^4 + 80240*t^4 - 100112*t^3*D - 7539*t^2*D^2 + 929*t*D^3 + 11*D^4 - 41040*t^3 - 4488*t^2*D - 19*t*D^2 - 11*D^3 - 880*t^2
================================================================================
Period sequence 60
First 10 period coefficients: [1, 0, 6, 48, 282, 2400, 22020, 184800, 1684410, 15798720]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(448, 547194, 'not terminal', 2)
(627, 425408, 'not terminal', 2)
(701, 61975, 'not terminal', 2)
(807, 541378, 'not terminal', 2)
(908, 420931, 'not terminal', 1)
(1032, 251675, 'not terminal', 2)
(1072, 253847, 'not terminal', 2)
(1089, 674630, 'not terminal', 2)
(1249, 506750, 'not terminal', 2)
(1372, 411847, 'not terminal', 2)
(1440, 251434, 'not terminal', 2)
(1465, 251577, 'not terminal', 2)
(1477, 672930, 'not terminal', 1)
(1782, 236727, 'not terminal', 1)
(1875, 669445, 'not terminal', 1)
(1922, 61366, 'not terminal', 1)
(1986, 534504, 'not terminal', 1)
(1998, 533766, 'not terminal', 2)
(2019, 491633, 'not terminal', 1)
(2084, 388931, 'not terminal', 1)
(2110, 387994, 'not terminal', 1)
(2279, 662688, 'not terminal', 1)
(2281, 662771, 'not terminal', 1)
(2576, 205713, 'not terminal', 1)
(2640, 652547, 'not terminal', 1)
(2827, 355343, 'not terminal', 1)
(3094, 464210, 'not terminal', 1)
(3096, 464237, 'not terminal', 1)
(3742, 524219, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
1247232*t^10*D^4 + 12472320*t^10*D^3 - 442368*t^9*D^4 + 43653120*t^10*D^2 - 13295616*t^9*D^3 - 5891072*t^8*D^4 + 62361600*t^10*D - 68714496*t^9*D^2 - 62338560*t^8*D^3 - 7118080*t^7*D^4 + 29933568*t^10 - 119709696*t^9*D - 214266880*t^8*D^2 - 58508544*t^7*D^3 - 3639360*t^6*D^4 - 63848448*t^9 - 294796800*t^8*D - 165859328*t^7*D^2 - 23801344*t^6*D^3 - 892480*t^5*D^4 - 136977408*t^8 - 197465088*t^7*D - 55640896*t^6*D^2 - 4516352*t^5*D^3 - 97424*t^4*D^4 - 82996224*t^7 - 56396544*t^6*D - 8295936*t^5*D^2 - 343024*t^4*D^3 - 1136*t^3*D^4 - 20968704*t^6 - 6676992*t^5*D - 412016*t^4*D^2 - 8112*t^3*D^3 + 1180*t^2*D^4 - 2031360*t^5 - 153936*t^4*D + 16272*t^3*D^2 - 2616*t^2*D^3 + 100*t*D^4 + 5664*t^4 + 20784*t^3*D + 1176*t^2*D^2 - 200*t*D^3 - 3*D^4 + 7680*t^3 + 720*t^2*D + 4*t*D^2 + 3*D^3 + 144*t^2
================================================================================
Period sequence 61
First 10 period coefficients: [1, 0, 2, 18, 30, 240, 1730, 5880, 41230, 262080]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(70, 430438, 'terminal', 2)
(156, 430089, 'not terminal', 2)
(164, 430087, 'not terminal', 2)
(199, 255736, 'terminal', 2)
(200, 255739, 'terminal', 2)
(304, 428956, 'not terminal', 2)
(374, 254899, 'not terminal', 2)
(947, 420849, 'not terminal', 1)
(1333, 413217, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
1354496*t^10*D^4 + 13544960*t^10*D^3 + 1777620*t^9*D^4 + 47407360*t^10*D^2 + 10887708*t^9*D^3 - 576869*t^8*D^4 + 67724800*t^10*D + 20885748*t^9*D^2 - 16478156*t^8*D^3 - 2884580*t^7*D^4 + 32507904*t^10 + 13107588*t^9*D - 76227493*t^8*D^2 - 29405720*t^7*D^3 - 2581425*t^6*D^4 + 1331928*t^9 - 121988422*t^8*D - 93829620*t^7*D^2 - 18142992*t^6*D^3 - 964126*t^5*D^4 - 61662216*t^8 - 120505288*t^7*D - 45107699*t^6*D^2 - 5062465*t^5*D^3 - 118707*t^4*D^4 - 53196808*t^7 - 47792116*t^6*D - 9737557*t^5*D^2 - 478620*t^4*D^3 + 7304*t^3*D^4 - 18297932*t^6 - 8142866*t^5*D - 721695*t^4*D^2 + 1710*t^3*D^3 + 4300*t^2*D^4 - 2542592*t^5 - 384238*t^4*D + 43954*t^3*D^2 - 8329*t^2*D^3 + 406*t*D^4 - 51996*t^4 + 53110*t^3*D + 2151*t^2*D^2 - 945*t*D^3 - 19*D^4 + 20540*t^3 + 1368*t^2*D + 7*t*D^2 + 19*D^3 + 304*t^2
================================================================================
Period sequence 62
First 10 period coefficients: [1, 0, 22, 174, 2514, 34200, 501070, 7586880, 117858370, 1870811040]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2093, 388975, 'not terminal', 1)
(2094, 388959, 'not terminal', 1)
(2183, 223152, 'not terminal', 1)
(2196, 223136, 'not terminal', 1)
(2461, 372774, 'not terminal', 1)
(2470, 372936, 'not terminal', 1)
(2566, 205948, 'not terminal', 1)
(2572, 205964, 'not terminal', 1)
(2605, 204826, 'not terminal', 2)
(2633, 652813, 'not terminal', 1)
(2634, 652811, 'not terminal', 1)
(2829, 355346, 'not terminal', 1)
(2830, 355485, 'not terminal', 1)
(2895, 186614, 'not terminal', 1)
(2900, 186305, 'not terminal', 1)
(2906, 186665, 'not terminal', 1)
(2921, 186624, 'not terminal', 1)
(2964, 639874, 'not terminal', 1)
(2967, 639888, 'not terminal', 1)
(2987, 639688, 'not terminal', 1)
(3012, 53111, 'not terminal', 1)
(3013, 57324, 'not terminal', 2)
(3099, 463651, 'not terminal', 1)
(3130, 338225, 'not terminal', 1)
(3135, 338159, 'not terminal', 1)
(3212, 166385, 'not terminal', 1)
(3216, 165868, 'not terminal', 1)
(3227, 166483, 'not terminal', 1)
(3241, 163424, 'not terminal', 2)
(3263, 625376, 'not terminal', 1)
(3264, 625356, 'not terminal', 1)
(3274, 624507, 'not terminal', 1)
(3295, 47424, 'not terminal', 1)
(3308, 11546, 'not terminal', 1)
(3311, 1454, 'not terminal', 1)
(3332, 526278, 'not terminal', 1)
(3403, 321254, 'not terminal', 1)
(3449, 147431, 'not terminal', 1)
(3454, 145662, 'not terminal', 1)
(3461, 145189, 'not terminal', 1)
(3474, 146747, 'not terminal', 1)
(3475, 146675, 'not terminal', 1)
(3478, 134479, 'not terminal', 2)
(3479, 140654, 'not terminal', 2)
(3506, 610781, 'not terminal', 1)
(3517, 608909, 'not terminal', 1)
(3530, 40830, 'not terminal', 1)
(3532, 41052, 'not terminal', 1)
(3537, 41139, 'not terminal', 1)
(3620, 306074, 'not terminal', 1)
(3622, 306881, 'not terminal', 1)
(3631, 306039, 'not terminal', 1)
(3644, 299287, 'not terminal', 1)
(3671, 127551, 'not terminal', 1)
(3679, 127689, 'not terminal', 1)
(3685, 125153, 'not terminal', 1)
(3686, 125313, 'not terminal', 1)
(3719, 34364, 'not terminal', 1)
(3781, 446309, 'not terminal', 1)
(3825, 112300, 'not terminal', 1)
(3829, 108209, 'not terminal', 1)
(3832, 109121, 'not terminal', 1)
(3835, 111932, 'not terminal', 1)
(3849, 585571, 'not terminal', 1)
(3859, 580257, 'not terminal', 1)
(3864, 582645, 'not terminal', 1)
(3897, 442952, 'not terminal', 1)
(3933, 283208, 'not terminal', 1)
(3942, 281839, 'not terminal', 1)
(3973, 94699, 'not terminal', 1)
(3988, 569725, 'not terminal', 1)
(4063, 83456, 'not terminal', 1)
(4066, 85150, 'not terminal', 1)
(4124, 268995, 'not terminal', 1)
(4136, 76930, 'not terminal', 1)
(4140, 77945, 'not terminal', 1)
(4221, 261560, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
1156602627*t^10*D^4 + 11566026270*t^10*D^3 + 2432454171*t^9*D^4 + 40481091945*t^10*D^2 + 21710463138*t^9*D^3 + 2180832814*t^8*D^4 + 57830131350*t^10*D + 69451424553*t^9*D^2 + 17076830696*t^8*D^3 + 1081614794*t^7*D^4 + 27758463048*t^10 + 92867844258*t^9*D + 49152182076*t^8*D^2 + 7275730258*t^7*D^3 + 320495624*t^6*D^4 + 42694428672*t^9 + 60631223566*t^8*D + 18475102414*t^7*D^2 + 1803663274*t^6*D^3 + 56396924*t^5*D^4 + 26375039372*t^8 + 20646075298*t^7*D + 3923559726*t^6*D^2 + 257499448*t^5*D^3 + 5230066*t^4*D^4 + 8365088348*t^7 + 3859944956*t^6*D + 453227034*t^5*D^2 + 19311296*t^4*D^3 + 113734*t^3*D^4 + 1418470580*t^6 + 369455180*t^5*D + 22953224*t^4*D^2 + 641894*t^3*D^3 - 18907*t^2*D^4 + 115564004*t^5 + 12261988*t^4*D - 49938*t^3*D^2 + 24976*t^2*D^3 - 1031*t*D^4 + 2204080*t^4 - 358692*t^3*D - 28323*t^2*D^2 + 2174*t*D^3 + 16*D^4 - 165208*t^3 - 16128*t^2*D - 55*t*D^2 - 16*D^3 - 2816*t^2
================================================================================
Period sequence 63
First 10 period coefficients: [1, 0, 4, 12, 60, 360, 1660, 10920, 57820, 361200]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(43, 520049, 'not terminal', 2)
(79, 430424, 'terminal', 3)
(173, 430080, 'not terminal', 2)
(207, 255869, 'terminal', 3)
(210, 255876, 'terminal', 3)
(254, 518681, 'not terminal', 2)
(258, 518659, 'not terminal', 2)
(312, 428884, 'not terminal', 2)
(403, 255692, 'not terminal', 3)
(415, 62076, 'terminal', 3)
(547, 516473, 'not terminal', 2)
(666, 425307, 'not terminal', 2)
(692, 254719, 'not terminal', 2)
(714, 254575, 'not terminal', 3)
(887, 512725, 'not terminal', 2)
(997, 420335, 'not terminal', 2)
(1039, 253620, 'not terminal', 2)
(1163, 539015, 'not terminal', 2)
(1348, 411764, 'not terminal', 2)
(1430, 245971, 'not terminal', 1)
(1565, 537075, 'not terminal', 1)
(1640, 500236, 'not terminal', 1)
(2792, 472378, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
17773000*t^10*D^4 + 177730000*t^10*D^3 + 40474600*t^9*D^4 + 622055000*t^10*D^2 + 342137200*t^9*D^3 + 35006590*t^8*D^4 + 888650000*t^10*D + 1040958200*t^9*D^2 + 237604410*t^8*D^3 + 15609102*t^7*D^4 + 426552000*t^10 + 1335033200*t^9*D + 589949660*t^8*D^2 + 67608452*t^7*D^3 + 3269777*t^6*D^4 + 595737600*t^9 + 631716960*t^8*D + 94515942*t^7*D^2 + 2082003*t^6*D^3 - 273098*t^5*D^4 + 244365120*t^8 + 35990992*t^7*D - 26967190*t^6*D^2 - 3678234*t^5*D^3 - 273119*t^4*D^4 - 6525600*t^7 - 52624056*t^6*D - 12378802*t^5*D^2 - 725109*t^4*D^3 - 31110*t^3*D^4 - 27039040*t^6 - 14070074*t^5*D - 1761490*t^4*D^2 + 28708*t^3*D^3 + 3995*t^2*D^4 - 5522072*t^5 - 1333728*t^4*D - 16484*t^3*D^2 + 2757*t^2*D^3 + 730*t*D^4 - 369728*t^4 + 31698*t^3*D + 4324*t^2*D^2 - 1726*t*D^3 - 19*D^4 + 20696*t^3 + 2736*t^2*D + 8*t*D^2 + 19*D^3 + 608*t^2
================================================================================
Period sequence 64
First 10 period coefficients: [1, 0, 12, 30, 396, 2160, 20370, 149520, 1315020, 10864560]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(283, 518147, 'not terminal', 3)
(356, 429574, 'not terminal', 4)
(1230, 505191, 'not terminal', 2)
(1352, 411509, 'not terminal', 2)
Maximum Picard rank: 4; minimum Picard rank: 2
The PF operator for this sequence is:
7017780*t^10*D^4 + 70177800*t^10*D^3 + 16251396*t^9*D^4 + 245622300*t^10*D^2 + 128401980*t^9*D^3 + 13257143*t^8*D^4 + 350889000*t^10*D + 364126980*t^9*D^2 + 90520212*t^8*D^3 + 5528430*t^7*D^4 + 168426720*t^10 + 437338020*t^9*D + 240070291*t^8*D^2 + 44261534*t^7*D^3 + 1584833*t^6*D^4 + 185361624*t^9 + 285426534*t^8*D + 127737312*t^7*D^2 + 13995814*t^6*D^3 + 3350*t^5*D^4 + 122619312*t^8 + 154965328*t^7*D + 35675145*t^6*D^2 + 701719*t^5*D^3 - 84236*t^4*D^4 + 65961120*t^7 + 37208908*t^6*D + 1945339*t^5*D^2 - 215470*t^4*D^3 - 6726*t^3*D^4 + 13821348*t^6 + 2053926*t^5*D - 130446*t^4*D^2 - 15509*t^3*D^3 + 991*t^2*D^4 + 788040*t^5 - 12156*t^4*D - 5829*t^3*D^2 - 1769*t^2*D^3 + 58*t*D^4 + 20736*t^4 - 1240*t^3*D + 1560*t^2*D^2 - 74*t*D^3 - 3*D^4 + 636*t^3 + 1104*t^2*D + 4*t*D^2 + 3*D^3 + 288*t^2
================================================================================
Period sequence 65
First 10 period coefficients: [1, 0, 6, 18, 114, 720, 4290, 28980, 193410, 1320480]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(184, 429942, 'not terminal', 3)
(423, 62055, 'terminal', 4)
(623, 425176, 'not terminal', 2)
(668, 254757, 'not terminal', 3)
(739, 674658, 'terminal', 4)
(870, 512540, 'not terminal', 2)
(961, 420256, 'not terminal', 2)
(1009, 424127, 'not terminal', 3)
(1059, 253743, 'not terminal', 2)
(1091, 674595, 'not terminal', 2)
(1263, 506666, 'not terminal', 2)
(1358, 412182, 'not terminal', 2)
(1442, 250852, 'not terminal', 2)
(2230, 222362, 'not terminal', 1)
(2520, 370274, 'not terminal', 1)
(2788, 472024, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
The PF operator for this sequence is:
15667875*t^10*D^4 + 156678750*t^10*D^3 + 19091850*t^9*D^4 + 548375625*t^10*D^2 + 215397900*t^9*D^3 - 4498560*t^8*D^4 + 783393750*t^10*D + 815091150*t^9*D^2 + 21764280*t^8*D^3 - 16922931*t^7*D^4 + 376029000*t^10 + 1223865900*t^9*D + 218888730*t^8*D^2 - 85744746*t^7*D^3 - 10302865*t^6*D^4 + 605080800*t^9 + 436837830*t^8*D - 145640001*t^7*D^2 - 51293046*t^6*D^3 - 2781604*t^5*D^4 + 244211940*t^8 - 90541746*t^7*D - 95983781*t^6*D^2 - 12202008*t^5*D^3 - 284739*t^4*D^4 - 13723560*t^7 - 80536644*t^6*D - 19790576*t^5*D^2 - 1313102*t^4*D^3 + 22956*t^3*D^4 - 25485444*t^6 - 14886198*t^5*D - 1363035*t^4*D^2 - 83249*t^3*D^3 + 7648*t^2*D^4 - 4318452*t^5 - 603400*t^4*D + 35973*t^3*D^2 - 11814*t^2*D^3 + 387*t*D^4 - 50232*t^4 + 62684*t^3*D + 5556*t^2*D^2 - 1012*t*D^3 - 17*D^4 + 27636*t^3 + 3536*t^2*D + 13*t*D^2 + 17*D^3 + 816*t^2
================================================================================
Period sequence 66
First 10 period coefficients: [1, 0, 4, 24, 132, 780, 5800, 40320, 283780, 2105880]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(321, 429049, 'not terminal', 2)
(367, 254887, 'not terminal', 2)
(411, 62089, 'terminal', 2)
(617, 425448, 'not terminal', 1)
(630, 425337, 'not terminal', 2)
(641, 425340, 'not terminal', 2)
(705, 61967, 'not terminal', 2)
(972, 420520, 'not terminal', 2)
(1034, 251654, 'not terminal', 1)
(1084, 674626, 'not terminal', 1)
(1085, 674625, 'not terminal', 1)
(1295, 413098, 'not terminal', 1)
(1342, 412982, 'not terminal', 1)
(1410, 246236, 'not terminal', 1)
(1491, 674235, 'not terminal', 1)
(1845, 235643, 'not terminal', 1)
(1850, 236271, 'not terminal', 1)
(2160, 387220, 'not terminal', 1)
(2241, 221583, 'not terminal', 1)
(2472, 372821, 'not terminal', 1)
(2504, 370044, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
5638657*t^10*D^4 + 56386570*t^10*D^3 + 1800728*t^9*D^4 + 197352995*t^10*D^2 - 10575632*t^9*D^3 - 10326258*t^8*D^4 + 281932850*t^10*D - 108471992*t^9*D^2 - 120938052*t^8*D^3 - 12240865*t^7*D^4 + 135327768*t^10 - 224375632*t^9*D - 437337374*t^8*D^2 - 104107654*t^7*D^3 - 5642818*t^6*D^4 - 128280000*t^9 - 620339628*t^8*D - 300321015*t^7*D^2 - 37022468*t^6*D^3 - 1235544*t^5*D^4 - 293614048*t^8 - 360226218*t^7*D - 85611618*t^6*D^2 - 5883390*t^5*D^3 - 127097*t^4*D^4 - 151771992*t^7 - 84675240*t^6*D - 9982548*t^5*D^2 - 338726*t^4*D^3 + 2588*t^3*D^4 - 30570960*t^6 - 7112472*t^5*D - 258889*t^4*D^2 - 17114*t^3*D^3 + 3522*t^2*D^4 - 1833168*t^5 + 111632*t^4*D + 33634*t^3*D^2 - 8886*t^2*D^3 + 209*t*D^4 + 126144*t^4 + 36080*t^3*D + 2254*t^2*D^2 - 418*t*D^3 - 10*D^4 + 12816*t^3 + 1440*t^2*D + 9*t*D^2 + 10*D^3 + 320*t^2
================================================================================
Period sequence 67
First 10 period coefficients: [1, 0, 10, 36, 366, 2640, 23320, 200760, 1815310, 16611840]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(266, 518758, 'not terminal', 2)
(335, 429060, 'not terminal', 2)
(341, 428575, 'not terminal', 3)
(631, 425271, 'not terminal', 2)
(820, 540280, 'not terminal', 3)
(889, 512668, 'not terminal', 2)
(921, 420848, 'not terminal', 1)
(968, 419980, 'not terminal', 2)
(975, 420522, 'not terminal', 2)
(982, 420617, 'not terminal', 2)
(1049, 254003, 'not terminal', 2)
(1077, 253434, 'not terminal', 3)
(1099, 674600, 'not terminal', 2)
(1112, 61961, 'terminal', 3)
(1265, 503547, 'not terminal', 3)
(1462, 251066, 'not terminal', 2)
(1468, 251408, 'not terminal', 2)
(1485, 674229, 'not terminal', 1)
(1499, 674080, 'not terminal', 2)
(1511, 674147, 'not terminal', 2)
(1514, 673746, 'not terminal', 3)
(1526, 61889, 'not terminal', 3)
(1554, 537119, 'not terminal', 1)
(1576, 536306, 'not terminal', 2)
(1607, 500133, 'not terminal', 1)
(1633, 500125, 'not terminal', 1)
(1673, 497292, 'not terminal', 2)
(1677, 498747, 'not terminal', 2)
(1744, 400004, 'not terminal', 2)
(1770, 400426, 'not terminal', 2)
(1773, 408230, 'not terminal', 3)
(1803, 236389, 'not terminal', 1)
(1861, 245758, 'not terminal', 2)
(1880, 672834, 'not terminal', 1)
(1881, 672698, 'not terminal', 1)
(1894, 672796, 'not terminal', 1)
(1895, 672899, 'not terminal', 1)
(1901, 672795, 'not terminal', 1)
(1902, 672679, 'not terminal', 2)
(1920, 670988, 'not terminal', 3)
(1927, 61752, 'not terminal', 1)
(1935, 61793, 'not terminal', 1)
(1940, 12636, 'not terminal', 1)
(2168, 385207, 'not terminal', 2)
(2169, 385054, 'not terminal', 2)
(2205, 221373, 'not terminal', 1)
(2265, 231109, 'not terminal', 2)
(2323, 667043, 'not terminal', 2)
(2394, 531025, 'not terminal', 2)
(2451, 475996, 'not terminal', 3)
(2503, 371265, 'not terminal', 1)
(2536, 370480, 'not terminal', 1)
(2544, 361261, 'not terminal', 2)
(2567, 205418, 'not terminal', 1)
(2587, 205060, 'not terminal', 1)
(2590, 202591, 'not terminal', 1)
(2611, 202529, 'not terminal', 1)
(2615, 202546, 'not terminal', 1)
(2636, 652240, 'not terminal', 1)
(2658, 660370, 'not terminal', 1)
(2672, 660322, 'not terminal', 1)
(2673, 660594, 'not terminal', 1)
(2675, 662247, 'not terminal', 1)
(2694, 59490, 'not terminal', 1)
(2775, 472376, 'not terminal', 1)
(2810, 470080, 'not terminal', 2)
(2850, 352406, 'not terminal', 1)
(2868, 353584, 'not terminal', 1)
(2883, 345957, 'not terminal', 2)
(2943, 178413, 'not terminal', 1)
(2944, 179896, 'not terminal', 1)
(2956, 181640, 'not terminal', 1)
(3109, 464064, 'not terminal', 1)
(3167, 334859, 'not terminal', 1)
(3168, 333898, 'not terminal', 1)
(3491, 134607, 'not terminal', 1)
(3501, 136423, 'not terminal', 1)
(3561, 525456, 'not terminal', 1)
(3570, 524845, 'not terminal', 2)
(3589, 451154, 'not terminal', 1)
(3660, 299797, 'not terminal', 1)
(4039, 438565, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
40704000*t^10*D^4 + 407040000*t^10*D^3 + 35195432*t^9*D^4 + 1424640000*t^10*D^2 + 359821752*t^9*D^3 - 17421612*t^8*D^4 + 2035200000*t^10*D + 1279044712*t^9*D^2 - 23158818*t^8*D^3 - 34617668*t^7*D^4 + 976896000*t^10 + 1846313352*t^9*D + 185538862*t^8*D^2 - 140881698*t^7*D^3 - 18518272*t^6*D^4 + 891894960*t^9 + 457404132*t^8*D - 195092810*t^7*D^2 - 71302560*t^6*D^3 - 4793329*t^5*D^4 + 266128064*t^8 - 88993356*t^7*D - 107715480*t^6*D^2 - 17135645*t^5*D^3 - 559445*t^4*D^4 - 164576*t^7 - 73283204*t^6*D - 23192388*t^5*D^2 - 2186397*t^4*D^3 + 3468*t^3*D^4 - 18308424*t^6 - 15169172*t^5*D - 1960848*t^4*D^2 - 152290*t^3*D^3 + 7042*t^2*D^4 - 3757912*t^5 - 872112*t^4*D + 25508*t^3*D^2 - 10612*t^2*D^3 + 397*t*D^4 - 82216*t^4 + 67784*t^3*D + 7700*t^2*D^2 - 885*t*D^3 - 13*D^4 + 31752*t^3 + 4784*t^2*D + 20*t*D^2 + 13*D^3 + 1040*t^2
================================================================================
Period sequence 68
First 10 period coefficients: [1, 0, 2, 36, 198, 840, 9200, 79800, 520870, 4289040]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(288, 518000, 'not terminal', 3)
(343, 428413, 'not terminal', 3)
(353, 428577, 'not terminal', 3)
(373, 254900, 'not terminal', 3)
(446, 547191, 'not terminal', 2)
(1384, 246275, 'not terminal', 1)
(1581, 500508, 'not terminal', 1)
(2719, 529908, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
11714560*t^10*D^4 + 117145600*t^10*D^3 + 73347072*t^9*D^4 + 410009600*t^10*D^2 + 787435520*t^9*D^3 - 7030784*t^8*D^4 + 585728000*t^10*D + 2890936320*t^9*D^2 - 176062464*t^8*D^3 - 44623168*t^7*D^4 + 281149440*t^10 + 4260966400*t^9*D - 1039609856*t^8*D^2 - 387633216*t^7*D^3 - 2730560*t^6*D^4 + 2084118528*t^9 - 1991854080*t^8*D - 1253849408*t^7*D^2 - 5108544*t^6*D^3 + 6481616*t^5*D^4 - 1121275904*t^8 - 1678567616*t^7*D - 3849840*t^6*D^2 + 38681280*t^5*D^3 + 938080*t^4*D^4 - 767728256*t^7 + 1633712*t^6*D + 85496804*t^5*D^2 + 5239800*t^4*D^3 + 34460*t^3*D^4 + 4725536*t^6 + 87990876*t^5*D + 8594840*t^4*D^2 - 302676*t^3*D^3 - 128*t^2*D^4 + 35356776*t^5 + 4493648*t^4*D - 530988*t^3*D^2 + 34614*t^2*D^3 - 2991*t*D^4 + 288592*t^4 - 488012*t^3*D - 10664*t^2*D^2 + 4708*t*D^3 + 91*D^4 - 155680*t^3 - 7488*t^2*D - 105*t*D^2 - 91*D^3 - 1456*t^2
================================================================================
Period sequence 69
First 10 period coefficients: [1, 0, 6, 12, 114, 480, 3480, 19320, 131250, 819840]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(215, 255837, 'terminal', 4)
(217, 255835, 'terminal', 4)
(390, 255547, 'not terminal', 3)
(395, 255714, 'not terminal', 3)
(396, 255695, 'not terminal', 3)
(424, 62056, 'terminal', 4)
(579, 516550, 'not terminal', 2)
(674, 427168, 'not terminal', 3)
(691, 254713, 'not terminal', 2)
(717, 254626, 'not terminal', 3)
(724, 254603, 'not terminal', 3)
(818, 541426, 'not terminal', 2)
(827, 513250, 'not terminal', 1)
(952, 419952, 'not terminal', 2)
(1055, 253608, 'not terminal', 2)
(1058, 253965, 'not terminal', 2)
(1242, 506663, 'not terminal', 2)
(1349, 409714, 'not terminal', 2)
(1444, 250763, 'not terminal', 2)
(1466, 250714, 'not terminal', 2)
(1666, 498739, 'not terminal', 2)
(2041, 491247, 'not terminal', 1)
(2055, 491513, 'not terminal', 1)
(2063, 491122, 'not terminal', 1)
(2153, 387094, 'not terminal', 1)
(2236, 220607, 'not terminal', 1)
(2727, 529930, 'not terminal', 1)
(2800, 473154, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
The PF operator for this sequence is:
18899832*t^10*D^4 + 188998320*t^10*D^3 + 21890868*t^9*D^4 + 661494120*t^10*D^2 + 218546520*t^9*D^3 + 5423846*t^8*D^4 + 944991600*t^10*D + 764007420*t^9*D^2 + 77738316*t^8*D^3 - 6233393*t^7*D^4 + 453595968*t^10 + 1090559640*t^9*D + 314725402*t^8*D^2 - 14860722*t^7*D^3 - 5608355*t^6*D^4 + 523207872*t^9 + 481365684*t^8*D + 11868353*t^7*D^2 - 19570096*t^6*D^3 - 1898868*t^5*D^4 + 238954752*t^8 + 54018354*t^7*D - 25589543*t^6*D^2 - 6267722*t^5*D^3 - 234989*t^4*D^4 + 33522672*t^7 - 13478322*t^6*D - 7112212*t^5*D^2 - 920750*t^4*D^3 + 19528*t^3*D^4 - 1891152*t^6 - 3304842*t^5*D - 491679*t^4*D^2 - 91202*t^3*D^3 + 6693*t^2*D^4 - 320088*t^5 + 55476*t^4*D + 28928*t^3*D^2 - 12442*t^2*D^3 + 245*t*D^4 + 138072*t^4 + 41688*t^3*D + 5175*t^2*D^2 - 616*t*D^3 - 18*D^4 + 17448*t^3 + 3456*t^2*D + 11*t*D^2 + 18*D^3 + 864*t^2
================================================================================
Period sequence 70
First 10 period coefficients: [1, 0, 0, 12, 24, 0, 540, 2520, 2520, 33600]
The PF operator has N=4, r=10
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(13, 544343, 'not terminal', 2)
(22, 520157, 'terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
1791552*t^10*D^4 + 17915520*t^10*D^3 - 3257408*t^9*D^4 + 62704320*t^10*D^2 - 45601696*t^9*D^3 - 11582192*t^8*D^4 + 89577600*t^10*D - 192174976*t^9*D^2 - 115185632*t^8*D^3 - 9712704*t^7*D^4 + 42997248*t^10 - 306174176*t^9*D - 387111760*t^8*D^2 - 79497312*t^7*D^3 - 3835316*t^6*D^4 - 156343488*t^9 - 528768736*t^8*D - 227214936*t^7*D^2 - 24043768*t^6*D^3 - 651612*t^5*D^4 - 245260416*t^8 - 271666248*t^7*D - 54853708*t^6*D^2 - 3332178*t^5*D^3 + 21859*t^4*D^4 - 114235920*t^7 - 53819672*t^6*D - 5662414*t^5*D^2 - 23202*t^4*D^3 + 22836*t^3*D^4 - 19236000*t^6 - 3705592*t^5*D + 5833*t^4*D^2 - 18999*t^3*D^3 + 5444*t^2*D^4 - 757392*t^5 + 135234*t^4*D + 45311*t^3*D^2 - 15331*t^2*D^3 + 212*t*D^4 + 88920*t^4 + 42862*t^3*D + 221*t^2*D^2 - 585*t*D^3 - 23*D^4 + 14904*t^3 + 92*t^2*D + 5*t*D^2 + 23*D^3
================================================================================
Period sequence 71
First 10 period coefficients: [1, 0, 22, 96, 1434, 12480, 148900, 1606080, 18905530, 220617600]
The PF operator has N=4, r=10
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(453, 547195, 'not terminal', 2)
(505, 542498, 'not terminal', 3)
(509, 542505, 'not terminal', 3)
(1990, 534507, 'not terminal', 1)
(2022, 491583, 'not terminal', 1)
(2040, 491586, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
191278080*t^10*D^4 + 1912780800*t^10*D^3 + 288371712*t^9*D^4 + 6694732800*t^10*D^2 + 2394224640*t^9*D^3 + 177334528*t^8*D^4 + 9563904000*t^10*D + 7156055040*t^9*D^2 + 1337342720*t^8*D^3 + 60344832*t^7*D^4 + 4590673920*t^10 + 9034168320*t^9*D + 3809686272*t^8*D^2 + 466633984*t^7*D^3 + 11220352*t^6*D^4 + 3983966208*t^9 + 4727677696*t^8*D + 1313840128*t^7*D^2 + 90381312*t^6*D^3 + 288512*t^5*D^4 + 2077999616*t^8 + 1574624000*t^7*D + 229349440*t^6*D^2 + 4998336*t^5*D^3 - 219488*t^4*D^4 + 667073024*t^7 + 243313408*t^6*D + 12273856*t^5*D^2 - 502368*t^4*D^3 - 18592*t^3*D^4 + 92554752*t^6 + 11805376*t^5*D - 357744*t^4*D^2 - 46032*t^3*D^3 + 1212*t^2*D^4 + 4168064*t^5 - 173328*t^4*D - 21376*t^3*D^2 - 2264*t^2*D^3 + 92*t*D^4 - 21856*t^4 - 9056*t^3*D + 2888*t^2*D^2 - 100*t*D^3 - 3*D^4 + 64*t^3 + 2064*t^2*D + 8*t*D^2 + 3*D^3 + 528*t^2
================================================================================
Period sequence 72
First 10 period coefficients: [1, 0, 104, 1752, 56424, 1677120, 54502520, 1820426160, 62621659240, 2199388148160]
The PF operator has N=5, r=11
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(3926, 283519, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
The PF operator for this sequence is:
875142460735488*t^11*D^5 + 13127136911032320*t^11*D^4 + 634434155970560*t^10*D^5 + 74387109162516480*t^11*D^3 + 8529943983030272*t^10*D^4 + 172536502026240*t^9*D^5 + 196907053665484800*t^11*D^2 + 44061219692216320*t^10*D^3 + 2129436357689344*t^9*D^4 + 17941302640640*t^8*D^5 + 239789034241523712*t^11*D + 108217792614891520*t^10*D^2 + 10167173492506624*t^9*D^3 + 236503000809472*t^8*D^4 - 768927004672*t^7*D^5 + 105017095288258560*t^11 + 124506540909527040*t^10*D + 23295417195167744*t^9*D^2 + 1108816353116160*t^8*D^3 + 6571739293696*t^7*D^4 - 369353522176*t^6*D^5 + 52454458159792128*t^10 + 25308950940483584*t^9*D + 2425663093071872*t^8*D^2 + 49637808971776*t^7*D^3 - 964070909696*t^6*D^4 - 34208459680*t^5*D^5 + 10223807382159360*t^9 + 2506639437684736*t^8*D + 116488414779392*t^7*D^2 - 427963221760*t^6*D^3 - 94027785344*t^5*D^4 - 1092297400*t^4*D^5 + 971230999560192*t^8 + 118980531472896*t^7*D + 1256837883008*t^6*D^2 - 94467999264*t^5*D^3 - 3686591816*t^4*D^4 + 12010280*t^3*D^5 + 44789259366912*t^7 + 1870858949504*t^6*D - 73999525984*t^5*D^2 - 250854272*t^4*D^3 - 127719008*t^3*D^4 + 984206*t^2*D^5 + 757925952000*t^6 - 27875043296*t^5*D - 1646103808*t^4*D^2 + 142408676*t^3*D^3 - 3475994*t^2*D^4 - 1779*t*D^5 - 4262289984*t^5 - 689517360*t^4*D - 11050228*t^3*D^2 + 2790018*t^2*D^3 + 2750*t*D^4 + 20*D^5 - 64389408*t^4 - 17475616*t^3*D - 354190*t^2*D^2 + 957*t*D^3 - 30*D^4 - 4128864*t^3 - 157760*t^2*D - 128*t*D^2 + 10*D^3 - 24960*t^2
================================================================================
Period sequence 73
First 10 period coefficients: [1, 0, 4, 12, 36, 240, 940, 4200, 25060, 104160]
The PF operator has N=5, r=12
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(35, 544230, 'not terminal', 2)
(64, 519913, 'not terminal', 3)
(466, 543539, 'not terminal', 1)
(544, 516865, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
2966385852416*t^12*D^5 + 34113437302784*t^12*D^4 + 2356768669696*t^11*D^5 + 148319292620800*t^12*D^3 + 25460284588032*t^11*D^4 + 494547271680*t^10*D^5 + 304054549872640*t^12*D^2 + 105704669249536*t^11*D^3 + 6035426983936*t^10*D^4 - 112676200448*t^9*D^5 + 293672199389184*t^12*D + 209830081069056*t^11*D^2 + 25846678036480*t^10*D^3 - 113455104000*t^9*D^4 - 65029783552*t^8*D^5 + 106789890686976*t^12 + 198401998520320*t^11*D + 51152163614720*t^10*D^2 + 580360202240*t^9*D^3 - 227848368128*t^8*D^4 - 6473688064*t^7*D^5 + 71173070782464*t^11 + 47730183925760*t^10*D + 1139517517824*t^9*D^2 - 507076398592*t^8*D^3 - 24827414528*t^7*D^4 + 1397328000*t^6*D^5 + 16883818635264*t^10 + 506668947456*t^9*D - 866129441536*t^8*D^2 + 6597131648*t^7*D^3 - 3225615552*t^6*D^4 + 319022880*t^5*D^5 - 51709464576*t^9 - 859823642368*t^8*D - 16300109952*t^7*D^2 + 15776774336*t^6*D^3 - 998474496*t^5*D^4 + 579088*t^4*D^5 - 338790154752*t^8 - 30702867456*t^7*D + 3675399392*t^6*D^2 + 1880718160*t^5*D^3 - 45883080*t^4*D^4 - 3167028*t^3*D^5 - 17205348864*t^7 - 1373362272*t^6*D - 402470064*t^5*D^2 + 105315760*t^4*D^3 + 13102688*t^3*D^4 + 8348*t^2*D^5 - 1609872192*t^6 - 457508512*t^5*D - 23208768*t^4*D^2 - 10906408*t^3*D^3 + 49454*t^2*D^4 + 3959*t*D^5 - 158088192*t^5 - 14495768*t^4*D + 214212*t^3*D^2 - 37728*t^2*D^3 - 11010*t*D^4 - 100*D^5 - 3663312*t^4 + 490656*t^3*D + 36718*t^2*D^2 + 4443*t*D^3 + 150*D^4 + 217584*t^3 + 20800*t^2*D + 8*t*D^2 - 50*D^3 + 4800*t^2
================================================================================
Period sequence 74
First 10 period coefficients: [1, 0, 2, 0, 54, 120, 740, 1680, 18550, 75600]
The PF operator has N=5, r=12
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(40, 544218, 'not terminal', 2)
(291, 429084, 'not terminal', 1)
(796, 541737, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
1117772255232*t^12*D^5 + 16766583828480*t^12*D^4 + 928016206848*t^11*D^5 + 95010641694720*t^12*D^3 + 11033815375872*t^11*D^4 + 49940582400*t^10*D^5 + 251498757427200*t^12*D^2 + 50017100313600*t^11*D^3 - 105394231296*t^10*D^4 - 68414913792*t^9*D^5 + 306269597933568*t^12*D + 107778676101120*t^11*D^2 - 3274498842624*t^10*D^3 - 744165388800*t^9*D^4 + 4359418368*t^8*D^5 + 134132670627840*t^12 + 109955054333952*t^11*D - 12517484857344*t^10*D^2 - 3048089700096*t^9*D^3 + 27785164800*t^8*D^4 + 385565056*t^7*D^5 + 42087679377408*t^11 - 17760034197504*t^10*D - 5999077108224*t^9*D^2 + 205156993536*t^8*D^3 + 19574657536*t^7*D^4 - 806479104*t^6*D^5 - 8361713369088*t^10 - 5702221928448*t^9*D + 685662019584*t^8*D^2 + 63294257024*t^7*D^3 - 726512128*t^6*D^4 + 161211872*t^5*D^5 - 2075484045312*t^9 + 945758982144*t^8*D + 85870717184*t^7*D^2 - 10508680576*t^6*D^3 - 231987136*t^5*D^4 + 12276624*t^4*D^5 + 441828209664*t^8 + 33139742976*t^7*D - 14218416512*t^6*D^2 + 953534688*t^5*D^3 - 82180560*t^4*D^4 - 4901156*t^3*D^5 - 5107926528*t^7 - 11636595968*t^6*D + 302989184*t^5*D^2 + 42037424*t^4*D^3 + 19225280*t^3*D^4 + 345440*t^2*D^5 - 3554476032*t^6 + 171872000*t^5*D - 6626320*t^4*D^2 - 14125420*t^3*D^3 - 1134952*t^2*D^4 - 4929*t*D^5 + 55568640*t^5 + 9280608*t^4*D + 606688*t^3*D^2 + 763192*t^2*D^3 + 13278*t*D^4 - 84*D^5 + 4916160*t^4 + 138528*t^3*D + 11872*t^2*D^2 - 7191*t*D^3 + 126*D^4 + 5472*t^3 + 8064*t^2*D + 18*t*D^2 - 42*D^3 + 2016*t^2
================================================================================
Period sequence 75
First 10 period coefficients: [1, 0, 24, 120, 1896, 19200, 255480, 3176880, 42635880, 571448640]
The PF operator has N=5, r=14
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1167, 539003, 'not terminal', 2)
(1216, 507648, 'not terminal', 1)
(1233, 506818, 'not terminal', 2)
(1251, 506553, 'not terminal', 2)
(1252, 506828, 'not terminal', 2)
(1286, 413305, 'not terminal', 1)
(1299, 413257, 'not terminal', 2)
(1323, 413262, 'not terminal', 2)
(1973, 545859, 'not terminal', 2)
(2026, 490442, 'not terminal', 1)
(2097, 388876, 'not terminal', 1)
(2101, 388943, 'not terminal', 1)
(2737, 530243, 'not terminal', 1)
(2776, 473967, 'not terminal', 1)
(2777, 472341, 'not terminal', 1)
(2791, 472855, 'not terminal', 1)
(2818, 355607, 'not terminal', 1)
(2889, 186748, 'not terminal', 1)
(3354, 458626, 'not terminal', 1)
(4014, 522631, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
492464171384832*t^14*D^5 + 5663337970925568*t^14*D^4 - 8056687558656*t^13*D^5 + 24623208569241600*t^14*D^3 - 1591680083951616*t^13*D^4 - 478343791116288*t^12*D^5 + 50477577566945280*t^14*D^2 - 11530124415467520*t^13*D^3 - 5955638463037440*t^12*D^4 - 333020928671744*t^11*D^5 + 48753952967098368*t^14*D - 30113846274293760*t^13*D^2 - 26527948420939776*t^12*D^3 - 3485976128651264*t^11*D^4 - 100538149961728*t^10*D^5 + 17728710169853952*t^14 - 33256111859564544*t^13*D - 54791452244312064*t^12*D^2 - 13950247375470592*t^11*D^3 - 987193982517248*t^10*D^4 - 13761142710272*t^9*D^5 - 13088766604345344*t^13 - 53184637207314432*t^12*D - 26949298905677824*t^11*D^2 - 3763980064980992*t^10*D^3 - 157203561357312*t^9*D^4 - 42602027008*t^8*D^5 - 19443838712020992*t^12 - 25169207216308224*t^11*D - 6979165333946368*t^10*D^2 - 606006107398144*t^9*D^3 - 13527846172672*t^8*D^4 + 258109720576*t^7*D^5 - 9017200486121472*t^11 - 6334907316633600*t^10*D - 1096548361003008*t^9*D^2 - 58552690632704*t^8*D^3 - 205079716864*t^7*D^4 + 34448642048*t^6*D^5 - 2230219707973632*t^10 - 970539846918144*t^9*D - 102888361121792*t^8*D^2 - 2767663343104*t^7*D^3 + 94643770368*t^6*D^4 + 1152614048*t^5*D^5 - 335369606307840*t^9 - 86264797796352*t^8*D - 4500053322752*t^7*D^2 - 56684698496*t^6*D^3 + 10694084192*t^5*D^4 - 121609880*t^4*D^5 - 28382192105472*t^8 - 3383276597760*t^7*D - 54587590272*t^6*D^2 - 11780940608*t^5*D^3 + 702033128*t^4*D^4 - 8497036*t^3*D^5 - 1003878355968*t^7 - 54736998144*t^6*D - 2571402080*t^5*D^2 - 949248880*t^4*D^3 + 42530472*t^3*D^4 + 84502*t^2*D^5 - 18420848640*t^6 - 2084959392*t^5*D + 156833440*t^4*D^2 - 39228344*t^3*D^3 - 210302*t^2*D^4 - 2749*t*D^5 - 514695744*t^5 + 159808752*t^4*D + 6098868*t^3*D^2 + 88058*t^2*D^3 + 7210*t*D^4 - 20*D^5 + 43250976*t^4 + 2780832*t^3*D + 48950*t^2*D^2 - 4613*t*D^3 + 30*D^4 + 549216*t^3 + 27840*t^2*D + 32*t*D^2 - 10*D^3 + 5760*t^2
================================================================================
Period sequence 76
First 10 period coefficients: [1, 0, 6, 12, 138, 480, 4560, 21840, 180810, 1031520]
The PF operator has N=5, r=14
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(127, 519609, 'not terminal', 2)
(260, 518755, 'not terminal', 2)
(326, 429061, 'not terminal', 2)
(331, 429042, 'not terminal', 2)
(360, 254911, 'not terminal', 2)
(539, 516907, 'not terminal', 1)
(604, 425463, 'not terminal', 1)
(812, 541418, 'not terminal', 2)
(861, 513246, 'not terminal', 1)
(1159, 539326, 'not terminal', 1)
(1202, 507563, 'not terminal', 1)
(1224, 507307, 'not terminal', 1)
(1225, 507642, 'not terminal', 1)
(1279, 413294, 'not terminal', 1)
(1643, 500333, 'not terminal', 1)
(2102, 388950, 'not terminal', 1)
(2382, 532222, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
1429650432000*t^14*D^5 + 21444756480000*t^14*D^4 + 2850457153536*t^13*D^5 + 121520286720000*t^14*D^3 + 41490610200576*t^13*D^4 + 1869069742080*t^12*D^5 + 321671347200000*t^14*D^2 + 229626387025920*t^13*D^3 + 27366987804672*t^12*D^4 + 122058995712*t^11*D^5 + 391724218368000*t^14*D + 597034210959360*t^13*D^2 + 149533243392000*t^12*D^3 + 4079203405824*t^11*D^4 - 425887872512*t^10*D^5 + 171558051840000*t^14 + 717712904945664*t^13*D + 381241042022400*t^12*D^2 + 25886468665344*t^11*D^3 - 2954959682048*t^10*D^4 - 222221078272*t^9*D^5 + 311664927965184*t^13 + 449554077388800*t^12*D + 64939672762368*t^11*D^2 - 10436475521536*t^10*D^3 - 1213674226176*t^9*D^4 - 44026839552*t^8*D^5 + 192348360695808*t^12 + 71017959849984*t^11*D - 23305532509696*t^10*D^2 - 3799764197120*t^9*D^3 - 46513594368*t^8*D^4 + 1608511744*t^7*D^5 + 28007611342848*t^11 - 28252349171712*t^10*D - 7812334688256*t^9*D^2 + 175745542656*t^8*D^3 + 41515247104*t^7*D^4 + 2960021920*t^6*D^5 - 12854220374016*t^10 - 8666257563648*t^9*D + 303121469952*t^8*D^2 + 186638778368*t^7*D^3 + 5418402400*t^6*D^4 + 476038032*t^5*D^5 - 3661041659904*t^9 + 176426500608*t^8*D + 225367059200*t^7*D^2 + 23754196640*t^6*D^3 - 74427680*t^5*D^4 - 31324048*t^4*D^5 + 37130812416*t^8 + 124849993728*t^7*D + 8731227296*t^6*D^2 + 1783616496*t^5*D^3 + 84881520*t^4*D^4 - 7764744*t^3*D^5 + 22459152384*t^7 - 1053241920*t^6*D - 903100384*t^5*D^2 - 35185472*t^4*D^3 + 37231184*t^3*D^4 + 74614*t^2*D^5 - 1920427776*t^6 - 744273408*t^5*D + 48587952*t^4*D^2 - 34382064*t^3*D^3 - 262630*t^2*D^4 - 3729*t*D^5 - 151517952*t^5 + 52501968*t^4*D + 2297560*t^3*D^2 + 77762*t^2*D^3 + 8770*t*D^4 - 68*D^5 + 16537824*t^4 + 1232256*t^3*D + 41758*t^2*D^2 - 6285*t*D^3 + 102*D^4 + 285408*t^3 + 22848*t^2*D + 20*t*D^2 - 34*D^3 + 4896*t^2
================================================================================
Period sequence 77
First 10 period coefficients: [1, 0, 6, 30, 138, 1260, 7710, 57960, 447930, 3312120]
The PF operator has N=5, r=14
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(116, 544026, 'not terminal', 2)
(333, 429045, 'not terminal', 2)
(562, 516794, 'not terminal', 2)
(616, 425457, 'not terminal', 2)
(811, 541431, 'not terminal', 2)
(888, 512866, 'not terminal', 2)
(1238, 506628, 'not terminal', 2)
(1289, 412762, 'not terminal', 1)
(1387, 246285, 'not terminal', 1)
(2191, 223129, 'not terminal', 1)
(2859, 353579, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
29918182130064*t^14*D^5 + 448772731950960*t^14*D^4 + 77674856895588*t^13*D^5 + 2543045481055440*t^14*D^3 + 1098063549687792*t^13*D^4 + 87294601862972*t^12*D^5 + 6731590979264400*t^14*D^2 + 5931769798664700*t^13*D^3 + 1218668126674264*t^12*D^4 + 51624935693501*t^11*D^5 + 8197581903637536*t^14*D + 15129767170396320*t^13*D^2 + 6485890236832180*t^12*D^3 + 763573836623770*t^11*D^4 + 12165245259209*t^10*D^5 + 3590181855607680*t^14 + 17929945602089712*t^13*D + 16305152421803960*t^12*D^2 + 4116780536640025*t^11*D^3 + 248675345045254*t^10*D^4 - 4116261221395*t^9*D^5 + 7711559537565888*t^13 + 19088114849948448*t^12*D + 10301995399007312*t^11*D^2 + 1441821446436361*t^10*D^3 + 13914846257812*t^9*D^4 - 3924876561743*t^8*D^5 + 8137479140165376*t^12 + 11941756983399780*t^11*D + 3627382438865756*t^10*D^2 + 204556551120181*t^9*D^3 - 16986634522544*t^8*D^4 - 1171318452622*t^7*D^5 + 5044593220102224*t^11 + 4139092112601888*t^10*D + 605599197705482*t^9*D^2 - 16476185809429*t^8*D^3 - 5391404852728*t^7*D^4 - 147343167226*t^6*D^5 + 1717021020386448*t^10 + 718891114897332*t^9*D + 23805695126612*t^8*D^2 - 8049528192350*t^7*D^3 - 727615882114*t^6*D^4 - 312998204*t^5*D^5 + 299756794690080*t^9 + 54074745817632*t^8*D - 4784524169180*t^7*D^2 - 797287516868*t^6*D^3 - 80598373666*t^5*D^4 + 2008464320*t^4*D^5 + 26553536499744*t^8 + 360957712536*t^7*D - 717615247604*t^6*D^2 - 7935300520*t^5*D^3 - 11557190388*t^4*D^4 + 176190960*t^3*D^5 + 926408335680*t^7 - 336323367504*t^6*D - 52484232242*t^5*D^2 + 8510761120*t^4*D^3 - 819649852*t^3*D^4 + 4018112*t^2*D^5 - 78460049664*t^6 - 39311605584*t^5*D - 3680161092*t^4*D^2 + 775576392*t^3*D^3 - 13735072*t^2*D^4 + 130080*t*D^5 - 12779097120*t^5 - 2738108448*t^4*D - 118885916*t^3*D^2 + 14593312*t^2*D^3 - 297600*t*D^4 + 2400*D^5 - 771145920*t^4 - 76157280*t^3*D - 1704032*t^2*D^2 + 275280*t*D^3 - 3600*D^4 - 19310400*t^3 - 887040*t^2*D - 1200*t*D^2 + 1200*D^3 - 172800*t^2
================================================================================
Period sequence 78
First 10 period coefficients: [1, 0, 4, 6, 36, 120, 490, 2520, 8260, 52080]
The PF operator has N=5, r=14
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(15, 544341, 'not terminal', 2)
(44, 520041, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
The PF operator for this sequence is:
14303191421664*t^14*D^5 + 214547871324960*t^14*D^4 - 15025223651328*t^13*D^5 + 1215771270841440*t^14*D^3 - 231107221308672*t^13*D^4 + 8331871648464*t^12*D^5 + 3218218069874400*t^14*D^2 - 1334432675750400*t^13*D^3 + 149745736796112*t^12*D^4 - 1157759818128*t^11*D^5 + 3919074449535936*t^14*D - 3581185650405120*t^13*D^2 + 951605979072336*t^12*D^3 - 23463607483584*t^11*D^4 - 254076253011*t^10*D^5 + 1716382970599680*t^14 - 4403354607401472*t^13*D + 2715860902892976*t^12*D^2 - 169774456064832*t^11*D^3 - 4675639421097*t^10*D^4 - 211964967801*t^9*D^5 - 1940519635089408*t^13 + 3474238886011872*t^12*D - 525777903028656*t^11*D^2 - 14772611684511*t^10*D^3 - 797460791004*t^9*D^4 + 47926982520*t^8*D^5 + 1568570097043584*t^12 - 704976074523936*t^11*D - 3817663428735*t^10*D^2 + 2645021339235*t^9*D^3 + 531800275392*t^8*D^4 + 25000325586*t^7*D^5 - 326666779894656*t^11 + 28785866750082*t^10*D + 11089848157542*t^9*D^2 + 536692541112*t^8*D^3 - 66629987271*t^7*D^4 - 3335347590*t^6*D^5 + 22252481662392*t^10 + 12988242584064*t^9*D - 998197943400*t^8*D^2 - 366351170535*t^7*D^3 - 16732550379*t^6*D^4 - 894156996*t^5*D^5 + 5070475135584*t^9 - 2025893665368*t^8*D - 249286772790*t^7*D^2 + 52561688586*t^6*D^3 + 9868445280*t^5*D^4 + 184761557*t^4*D^5 - 966168224640*t^8 - 776269224*t^7*D + 20559637221*t^6*D^2 - 14971265172*t^5*D^3 - 1027823722*t^4*D^4 - 8961885*t^3*D^5 + 61047003456*t^7 + 5526888438*t^6*D + 934859760*t^5*D^2 + 1532152993*t^4*D^3 + 37126179*t^3*D^4 - 720220*t^2*D^5 - 2398264704*t^6 + 705777768*t^5*D - 163025792*t^4*D^2 - 62822556*t^3*D^3 + 3807090*t^2*D^4 + 44000*t*D^5 + 262372608*t^5 - 140287392*t^4*D + 5600376*t^3*D^2 - 2697396*t^2*D^3 - 156016*t*D^4 - 1792*D^5 - 40722048*t^4 + 7513344*t^3*D + 277742*t^2*D^2 + 67984*t*D^3 + 4480*D^4 + 2903040*t^3 + 86016*t^2*D + 16*t*D^2 - 1792*D^3
================================================================================
Period sequence 79
First 10 period coefficients: [1, 0, 2, 18, 54, 300, 2090, 10500, 63910, 405720]
The PF operator has N=5, r=14
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(123, 519655, 'not terminal', 2)
(336, 429055, 'not terminal', 2)
(361, 254912, 'not terminal', 2)
(495, 543396, 'not terminal', 2)
(580, 516713, 'not terminal', 2)
(853, 513181, 'not terminal', 1)
(2042, 491423, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
181353806525760*t^14*D^5 + 2720307097886400*t^14*D^4 + 351418278541628*t^13*D^5 + 15415073554689600*t^14*D^3 + 4702872268227392*t^13*D^4 + 236040756119092*t^12*D^5 + 40804606468296000*t^14*D^2 + 24186534577068100*t^13*D^3 + 2485084756338012*t^12*D^4 + 55576958760007*t^11*D^5 + 49690942988058240*t^14*D + 59175045825470320*t^13*D^2 + 9896525647035484*t^12*D^3 + 155345942899038*t^11*D^4 - 8183631518334*t^10*D^5 + 21762456783091200*t^14 + 67868512825554672*t^13*D + 18495703024480884*t^12*D^2 - 1170723849420701*t^11*D^3 - 288303799410196*t^10*D^4 - 9117316023536*t^9*D^5 + 28528547587466688*t^13 + 16170437449572592*t^12*D - 5987571934942296*t^11*D^2 - 1790545454352986*t^10*D^3 - 116614688677232*t^9*D^4 - 2999800423798*t^8*D^5 + 5322216071908272*t^12 - 9160345436956628*t^11*D - 4476826021865168*t^10*D^2 - 490887824353832*t^9*D^3 - 21153745524302*t^8*D^4 - 454117289916*t^7*D^5 - 4443266335574064*t^11 - 4970959893425068*t^10*D - 921236265232360*t^9*D^2 - 61235566898432*t^8*D^3 - 1626808409356*t^7*D^4 - 8049532480*t^6*D^5 - 2004559158021024*t^10 - 802363630447232*t^9*D - 76862967226456*t^8*D^2 - 4099438183910*t^7*D^3 + 21756904902*t^6*D^4 + 8807738232*t^5*D^5 - 263803456948560*t^9 - 43546528840032*t^8*D - 1548739614086*t^7*D^2 - 250498582840*t^6*D^3 - 33987740844*t^5*D^4 + 1564012512*t^4*D^5 - 8293651603920*t^8 + 712019128136*t^7*D + 12671148498*t^6*D^2 + 19814648380*t^5*D^3 - 8357179128*t^4*D^4 + 24677880*t^3*D^5 + 579638898720*t^7 - 17242542784*t^6*D - 8496736464*t^5*D^2 + 8678556124*t^4*D^3 - 119249148*t^3*D^4 - 177584*t^2*D^5 - 19456744992*t^6 - 9486781504*t^5*D - 678325452*t^4*D^2 + 161891224*t^3*D^3 + 1454568*t^2*D^4 + 54512*t*D^5 - 3191315424*t^5 - 497969728*t^4*D - 14909076*t^3*D^2 - 489688*t^2*D^3 - 127064*t*D^4 + 576*D^5 - 137271744*t^4 - 8369632*t^3*D - 108240*t^2*D^2 + 76192*t*D^3 - 864*D^4 - 2040000*t^3 - 64512*t^2*D - 184*t*D^2 + 288*D^3 - 13824*t^2
================================================================================
Period sequence 80
First 10 period coefficients: [1, 0, 6, 30, 210, 1440, 11310, 87780, 704130, 5784240]
The PF operator has N=5, r=14
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(332, 429052, 'not terminal', 2)
(518, 516960, 'not terminal', 1)
(628, 425407, 'not terminal', 2)
(686, 254017, 'not terminal', 2)
(872, 512882, 'not terminal', 2)
(964, 420516, 'not terminal', 2)
(1210, 507250, 'not terminal', 1)
(1237, 506627, 'not terminal', 2)
(1294, 413055, 'not terminal', 1)
(1403, 246125, 'not terminal', 1)
(1411, 246158, 'not terminal', 2)
(1605, 500012, 'not terminal', 1)
(2243, 222610, 'not terminal', 1)
(2282, 662750, 'not terminal', 1)
(2512, 369371, 'not terminal', 1)
(2865, 352782, 'not terminal', 1)
(2869, 353583, 'not terminal', 1)
(2947, 181674, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
The PF operator for this sequence is:
14636306378232*t^14*D^5 + 219544595673480*t^14*D^4 + 51763444926795*t^13*D^5 + 1244086042149720*t^14*D^3 + 745794262771488*t^13*D^4 + 92980795368336*t^12*D^5 + 3293168935102200*t^14*D^2 + 4093318707473205*t^13*D^3 + 1304230957763190*t^12*D^4 + 93390497735785*t^11*D^5 + 4010347947635568*t^14*D + 10573765718963580*t^13*D^2 + 7056196500358164*t^12*D^3 + 1209127913909914*t^11*D^4 + 57153407866228*t^10*D^5 + 1756356765387840*t^14 + 12650313353419980*t^13*D + 18099676641219474*t^12*D^2 + 6096479483112917*t^11*D^3 + 650030215650860*t^10*D^4 + 22523156875206*t^9*D^5 + 5475835524084912*t^13 + 21586714131180708*t^12*D + 14712409956914696*t^11*D^2 + 2916287841430532*t^10*D^3 + 214567618386480*t^9*D^4 + 5817029765842*t^8*D^5 + 9331983827924544*t^12 + 16703686767793044*t^11*D + 6354949096978720*t^10*D^2 + 820708167568110*t^9*D^3 + 44044480073614*t^8*D^4 + 946946284200*t^7*D^5 + 6972018877817136*t^11 + 6634805731057428*t^10*D + 1555210107029316*t^9*D^2 + 136370818832108*t^8*D^3 + 5464036792116*t^7*D^4 + 75508535784*t^6*D^5 + 2603267667724608*t^10 + 1443902341405440*t^9*D + 214457261140712*t^8*D^2 + 12480957260946*t^7*D^3 + 419109213318*t^6*D^4 - 3783974072*t^5*D^5 + 517374957720528*t^9 + 169326950578344*t^8*D + 15043138604550*t^7*D^2 + 468045992436*t^6*D^3 + 41251310980*t^5*D^4 - 1498504424*t^4*D^5 + 53107458272784*t^8 + 9271672650984*t^7*D + 380252630262*t^6*D^2 - 24536952592*t^5*D^3 + 6816049940*t^4*D^4 - 100345496*t^3*D^5 + 2337830262720*t^7 + 143601291456*t^6*D + 5810775524*t^5*D^2 - 6727443772*t^4*D^3 + 475059420*t^3*D^4 + 340224*t^2*D^5 + 26428640832*t^6 + 7319724960*t^5*D + 1225541608*t^4*D^2 - 476863600*t^3*D^3 - 1651248*t^2*D^4 - 42256*t*D^5 + 3274969824*t^5 + 1050131424*t^4*D + 33053724*t^3*D^2 - 326760*t^2*D^3 + 98920*t*D^4 - 448*D^5 + 279677952*t^4 + 16193760*t^3*D + 263784*t^2*D^2 - 59648*t*D^3 + 672*D^4 + 3287232*t^3 + 150528*t^2*D + 296*t*D^2 - 224*D^3 + 32256*t^2
================================================================================
Period sequence 81
First 10 period coefficients: [1, 0, 14, 48, 594, 4200, 41900, 372960, 3677170, 35671440]
The PF operator has N=5, r=14
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(229, 543794, 'not terminal', 2)
(289, 518175, 'not terminal', 3)
(935, 420847, 'not terminal', 2)
(1560, 537051, 'not terminal', 1)
(1636, 499833, 'not terminal', 1)
(1662, 497198, 'not terminal', 2)
(1902, 672679, 'not terminal', 2)
(2567, 205418, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
The PF operator for this sequence is:
136626877619712*t^14*D^5 + 2049403164295680*t^14*D^4 + 257570043734016*t^13*D^5 + 11613284597675520*t^14*D^3 + 3397762826993664*t^13*D^4 + 195672231919872*t^12*D^5 + 30741047464435200*t^14*D^2 + 17235575427225600*t^13*D^3 + 2294339294361600*t^12*D^4 + 73540804281408*t^11*D^5 + 37435764467801088*t^14*D + 41650685824573440*t^13*D^2 + 10513192011190272*t^12*D^3 + 792926373108096*t^11*D^4 + 11730028071456*t^10*D^5 + 16395225314365440*t^14 + 47284800532291584*t^13*D + 23331170580890112*t^12*D^2 + 3316185917238528*t^11*D^3 + 135676997014176*t^10*D^4 - 828087328512*t^9*D^5 + 19729497351684096*t^13 + 24750417890246400*t^12*D + 6734576395511424*t^11*D^2 + 524920332235392*t^10*D^3 + 4919130073440*t^9*D^4 - 622087928832*t^8*D^5 + 9833772258104832*t^12 + 6604558429762368*t^11*D + 942362744687424*t^10*D^2 + 20411613806688*t^9*D^3 - 1993027970304*t^8*D^4 - 75148250524*t^7*D^5 + 2466782382662784*t^11 + 807149615894208*t^10*D + 17531487236160*t^9*D^2 - 5154350427120*t^8*D^3 - 286750757888*t^7*D^4 + 2789782404*t^6*D^5 + 265760234499456*t^10 - 6889610193408*t^9*D - 11754198299232*t^8*D^2 - 480911562300*t^7*D^3 - 10773229140*t^6*D^4 + 1169745114*t^5*D^5 - 9785624976576*t^9 - 13009679361840*t^8*D - 1248359629144*t^7*D^2 + 41076961092*t^6*D^3 - 424492644*t^5*D^4 + 40760462*t^4*D^5 - 5308640823456*t^8 - 1258409927552*t^7*D - 29659662108*t^6*D^2 + 7363213694*t^5*D^3 - 706298*t^4*D^4 - 4926779*t^3*D^5 - 478215242400*t^7 - 42519396120*t^6*D + 303282156*t^5*D^2 + 289631766*t^4*D^3 + 16783620*t^3*D^4 - 232052*t^2*D^5 - 17660772144*t^6 - 768241160*t^5*D - 50527714*t^4*D^2 - 13439195*t^3*D^3 + 897922*t^2*D^4 + 3427*t*D^5 - 377975424*t^5 - 53988056*t^4*D - 592198*t^3*D^2 - 665468*t^2*D^3 - 8938*t*D^4 - 52*D^5 - 17894352*t^4 + 882624*t^3*D + 87734*t^2*D^2 + 3487*t*D^3 + 78*D^4 + 410544*t^3 + 43264*t^2*D + 48*t*D^2 - 26*D^3 + 8736*t^2
================================================================================
Period sequence 82
First 10 period coefficients: [1, 0, 12, 36, 420, 2700, 24420, 200340, 1784580, 15908760]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(599, 515587, 'not terminal', 3)
(670, 254738, 'not terminal', 3)
(974, 420461, 'not terminal', 2)
(986, 420318, 'not terminal', 2)
(1037, 251665, 'not terminal', 2)
(1670, 496119, 'not terminal', 2)
(1746, 398434, 'not terminal', 2)
(1747, 398237, 'not terminal', 2)
(1800, 236110, 'not terminal', 1)
(2197, 222907, 'not terminal', 1)
(2207, 220645, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 83
First 10 period coefficients: [1, 0, 10, 30, 318, 1740, 15310, 106260, 891310, 6898080]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(287, 518150, 'not terminal', 3)
Maximum Picard rank: 3; minimum Picard rank: 3
================================================================================
Period sequence 84
First 10 period coefficients: [1, 0, 2, 6, 30, 60, 470, 1680, 7630, 34440]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(28, 520136, 'smooth', 3)
(167, 430039, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 85
First 10 period coefficients: [1, 0, 12, 54, 540, 4620, 43770, 425880, 4256700, 43462440]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(983, 420459, 'not terminal', 2)
(1048, 253985, 'not terminal', 2)
(1081, 253431, 'not terminal', 3)
(1394, 246053, 'not terminal', 1)
(1424, 246062, 'not terminal', 1)
(1455, 251399, 'not terminal', 2)
(1504, 674149, 'not terminal', 2)
(1505, 674141, 'not terminal', 2)
(1775, 408716, 'not terminal', 3)
(1829, 236336, 'not terminal', 1)
(1865, 245697, 'not terminal', 2)
(1866, 245712, 'not terminal', 2)
(1878, 669466, 'not terminal', 1)
(1912, 672425, 'not terminal', 2)
(1924, 61810, 'not terminal', 1)
(1932, 61797, 'not terminal', 2)
(2104, 387010, 'not terminal', 1)
(2149, 388568, 'not terminal', 1)
(2206, 220898, 'not terminal', 1)
(2256, 234961, 'not terminal', 2)
(2264, 234666, 'not terminal', 2)
(2292, 662763, 'not terminal', 1)
(2314, 669245, 'not terminal', 1)
(2328, 61317, 'not terminal', 1)
(2328, 61317, 'not terminal', 1)
(2540, 365106, 'not terminal', 2)
(2582, 202533, 'not terminal', 1)
(2586, 204255, 'not terminal', 1)
(2638, 652299, 'not terminal', 1)
(2659, 660595, 'not terminal', 1)
(2684, 59845, 'not terminal', 1)
(2844, 351081, 'not terminal', 1)
(2970, 638861, 'not terminal', 1)
(2970, 638861, 'not terminal', 1)
(2990, 639036, 'not terminal', 1)
(2996, 648677, 'not terminal', 1)
(3170, 333608, 'not terminal', 1)
(3243, 156909, 'not terminal', 1)
(3245, 161494, 'not terminal', 1)
(3489, 135822, 'not terminal', 1)
(3955, 280470, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 86
First 10 period coefficients: [1, 0, 4, 6, 60, 180, 1210, 5460, 30940, 165480]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(77, 430420, 'terminal', 3)
(78, 430425, 'terminal', 3)
(168, 430091, 'not terminal', 2)
(206, 255875, 'terminal', 3)
(314, 428886, 'not terminal', 2)
(376, 254876, 'not terminal', 2)
(378, 254829, 'not terminal', 2)
(583, 516501, 'not terminal', 2)
(633, 425104, 'not terminal', 2)
(994, 419984, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 87
First 10 period coefficients: [1, 0, 6, 18, 114, 660, 3930, 25620, 163170, 1101240]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(193, 430358, 'not terminal', 4)
(219, 255778, 'smooth', 5)
(347, 428552, 'not terminal', 3)
(407, 255334, 'not terminal', 4)
(595, 515145, 'not terminal', 3)
(675, 427137, 'not terminal', 3)
(677, 254744, 'not terminal', 3)
(897, 512864, 'not terminal', 2)
(1058, 253965, 'not terminal', 2)
(1331, 412937, 'not terminal', 1)
(1444, 250763, 'not terminal', 2)
(1466, 250714, 'not terminal', 2)
(1838, 235624, 'not terminal', 1)
(2153, 387094, 'not terminal', 1)
(2154, 387777, 'not terminal', 1)
(2236, 220607, 'not terminal', 1)
Maximum Picard rank: 5; minimum Picard rank: 1
================================================================================
Period sequence 88
First 10 period coefficients: [1, 0, 12, 42, 468, 3360, 31350, 275940, 2599380, 24566640]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(601, 515517, 'not terminal', 3)
(667, 254764, 'not terminal', 3)
(884, 512673, 'not terminal', 2)
(935, 420847, 'not terminal', 2)
(1047, 253987, 'not terminal', 2)
(1080, 253446, 'not terminal', 3)
(1364, 412320, 'not terminal', 2)
(1453, 251391, 'not terminal', 2)
(1485, 674229, 'not terminal', 1)
(1503, 674142, 'not terminal', 2)
(1573, 535773, 'not terminal', 2)
(1662, 497198, 'not terminal', 2)
(1667, 497674, 'not terminal', 2)
(1799, 236106, 'not terminal', 1)
(1863, 245713, 'not terminal', 2)
(1901, 672795, 'not terminal', 1)
(1902, 672679, 'not terminal', 2)
(1902, 672679, 'not terminal', 2)
(2205, 221373, 'not terminal', 1)
(2305, 668857, 'not terminal', 1)
(2567, 205418, 'not terminal', 1)
(2567, 205418, 'not terminal', 1)
(2580, 203196, 'not terminal', 1)
(2636, 652240, 'not terminal', 1)
(2658, 660370, 'not terminal', 1)
(2943, 178413, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 89
First 10 period coefficients: [1, 0, 6, 12, 90, 360, 2040, 10500, 54810, 313320]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(109, 544032, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 90
First 10 period coefficients: [1, 0, 4, 6, 36, 180, 490, 4200, 11620, 89880]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(29, 520138, 'smooth', 3)
(51, 520057, 'not terminal', 2)
(80, 430411, 'terminal', 3)
(165, 430057, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 91
First 10 period coefficients: [1, 0, 22, 108, 1530, 14760, 178240, 2070600, 25464250, 316234800]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(808, 541389, 'not terminal', 2)
(882, 512859, 'not terminal', 2)
(892, 512907, 'not terminal', 2)
(1362, 412324, 'not terminal', 2)
(1619, 500080, 'not terminal', 1)
(1632, 500353, 'not terminal', 2)
(1696, 402508, 'not terminal', 1)
(2384, 532505, 'not terminal', 1)
(2422, 481662, 'not terminal', 1)
(2423, 482062, 'not terminal', 1)
(2466, 372746, 'not terminal', 1)
(2905, 186059, 'not terminal', 1)
(3148, 337640, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 92
First 10 period coefficients: [1, 0, 6, 12, 114, 420, 3120, 15540, 104370, 600600]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(191, 430367, 'not terminal', 4)
(346, 428554, 'not terminal', 3)
(585, 516766, 'not terminal', 2)
(1330, 412989, 'not terminal', 1)
(1730, 401519, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 93
First 10 period coefficients: [1, 0, 4, 12, 36, 300, 940, 6300, 31780, 157080]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(82, 430513, 'smooth', 4)
(180, 429937, 'not terminal', 3)
(189, 429939, 'not terminal', 3)
(308, 429028, 'not terminal', 2)
(943, 420747, 'not terminal', 1)
(1329, 412994, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 94
First 10 period coefficients: [1, 0, 16, 72, 912, 8280, 91600, 992880, 11282320, 129946320]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(814, 541434, 'not terminal', 2)
(864, 513262, 'not terminal', 1)
(890, 512904, 'not terminal', 2)
(891, 512868, 'not terminal', 2)
(928, 420923, 'not terminal', 2)
(1324, 413095, 'not terminal', 1)
(1594, 500514, 'not terminal', 1)
(1619, 500080, 'not terminal', 1)
(1696, 402508, 'not terminal', 1)
(1908, 672614, 'not terminal', 2)
(2384, 532505, 'not terminal', 1)
(2422, 481662, 'not terminal', 1)
(2423, 482062, 'not terminal', 1)
(2425, 481589, 'not terminal', 1)
(2558, 205468, 'not terminal', 1)
(2696, 12518, 'not terminal', 1)
(3301, 51708, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 95
First 10 period coefficients: [1, 0, 8, 18, 168, 900, 6110, 42000, 287560, 2084040]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(334, 429010, 'not terminal', 2)
(348, 428553, 'not terminal', 3)
(399, 255706, 'not terminal', 3)
(589, 516777, 'not terminal', 2)
(810, 541067, 'not terminal', 2)
(874, 512805, 'not terminal', 2)
(1059, 253743, 'not terminal', 2)
(1327, 412991, 'not terminal', 1)
(1337, 412983, 'not terminal', 1)
(1733, 401407, 'not terminal', 1)
(2437, 480933, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 96
First 10 period coefficients: [1, 0, 54, 528, 10698, 184320, 3531780, 68680080, 1376756010, 28139949600]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1650, 500380, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 97
First 10 period coefficients: [1, 0, 58, 600, 13182, 247440, 5212300, 111835920, 2480747710, 56184565920]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2569, 205970, 'not terminal', 2)
(2790, 473334, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 98
First 10 period coefficients: [1, 0, 6, 6, 114, 240, 3030, 9660, 95970, 394800]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(172, 430092, 'not terminal', 2)
(183, 429943, 'not terminal', 3)
(213, 255880, 'terminal', 3)
(381, 254895, 'not terminal', 2)
(487, 542864, 'not terminal', 2)
(557, 516557, 'not terminal', 2)
(611, 425441, 'not terminal', 1)
(646, 425362, 'not terminal', 2)
(896, 511645, 'not terminal', 2)
(946, 420783, 'not terminal', 1)
(1025, 251668, 'not terminal', 1)
(1332, 413114, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 99
First 10 period coefficients: [1, 0, 20, 96, 1188, 10860, 114320, 1207920, 13014820, 143382120]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(456, 547202, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 100
First 10 period coefficients: [1, 0, 14, 48, 642, 4680, 49820, 461580, 4811170, 48780480]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(576, 516693, 'not terminal', 2)
(862, 513234, 'not terminal', 1)
(904, 510713, 'not terminal', 3)
(1002, 424846, 'not terminal', 3)
(1010, 424638, 'not terminal', 3)
(1044, 253986, 'not terminal', 3)
(1259, 505542, 'not terminal', 2)
(1307, 413173, 'not terminal', 2)
(1660, 497546, 'not terminal', 2)
(1999, 534228, 'not terminal', 2)
(2070, 488832, 'not terminal', 2)
(2071, 486898, 'not terminal', 2)
(2099, 388738, 'not terminal', 1)
(2280, 662683, 'not terminal', 1)
(2476, 372670, 'not terminal', 1)
(2826, 354817, 'not terminal', 1)
(2894, 186242, 'not terminal', 1)
(3643, 299902, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 101
First 10 period coefficients: [1, 0, 20, 132, 1572, 18120, 221420, 2807280, 36649060, 488014800]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(455, 547196, 'not terminal', 2)
(883, 512876, 'not terminal', 2)
(1254, 506827, 'not terminal', 2)
(1326, 413260, 'not terminal', 2)
(1655, 498894, 'not terminal', 2)
(1710, 402432, 'not terminal', 2)
(1972, 545866, 'not terminal', 2)
(2000, 533771, 'not terminal', 2)
(2067, 489544, 'not terminal', 2)
(2075, 489543, 'not terminal', 2)
(2885, 186731, 'not terminal', 1)
(3352, 458617, 'not terminal', 1)
(4010, 522634, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 102
First 10 period coefficients: [1, 0, 4, 12, 60, 300, 1660, 8820, 51100, 293160]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(81, 430515, 'smooth', 4)
(179, 429954, 'not terminal', 3)
(214, 255838, 'terminal', 4)
(319, 429026, 'not terminal', 2)
(389, 255697, 'not terminal', 3)
(393, 255691, 'not terminal', 3)
(402, 255667, 'not terminal', 3)
(622, 425119, 'not terminal', 2)
(637, 425381, 'not terminal', 2)
(643, 425274, 'not terminal', 2)
(957, 420093, 'not terminal', 2)
(1330, 412989, 'not terminal', 1)
(1730, 401519, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 103
First 10 period coefficients: [1, 0, 6, 24, 138, 960, 6180, 43680, 311850, 2274720]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(150, 519308, 'not terminal', 3)
(195, 430357, 'not terminal', 4)
(328, 429040, 'not terminal', 2)
(426, 62053, 'terminal', 4)
(499, 543409, 'not terminal', 2)
(590, 516776, 'not terminal', 2)
(682, 426422, 'not terminal', 4)
(719, 254640, 'not terminal', 3)
(726, 254352, 'not terminal', 4)
(819, 540304, 'not terminal', 3)
(871, 512161, 'not terminal', 2)
(923, 420856, 'not terminal', 1)
(960, 419214, 'not terminal', 2)
(980, 420523, 'not terminal', 2)
(1043, 253688, 'not terminal', 2)
(1432, 246200, 'not terminal', 1)
(1449, 251082, 'not terminal', 2)
(1490, 674237, 'not terminal', 1)
(1508, 674052, 'not terminal', 2)
(1575, 536190, 'not terminal', 2)
(1647, 500332, 'not terminal', 1)
(1765, 400086, 'not terminal', 2)
(1808, 236266, 'not terminal', 1)
(1837, 236224, 'not terminal', 1)
(1889, 672831, 'not terminal', 1)
(2448, 479576, 'not terminal', 2)
(2607, 201900, 'not terminal', 1)
(2609, 202559, 'not terminal', 1)
(2796, 473037, 'not terminal', 1)
(3564, 525458, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 104
First 10 period coefficients: [1, 0, 6, 18, 90, 660, 2850, 21840, 120330, 798840]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(148, 519310, 'not terminal', 3)
(323, 429039, 'not terminal', 2)
(498, 543408, 'not terminal', 2)
(582, 516762, 'not terminal', 2)
(944, 420858, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 105
First 10 period coefficients: [1, 0, 6, 12, 90, 480, 2400, 16800, 88410, 608160]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(66, 519912, 'not terminal', 3)
(216, 255836, 'terminal', 4)
(290, 518098, 'not terminal', 3)
(312, 428884, 'not terminal', 2)
(345, 428555, 'not terminal', 3)
(394, 255699, 'not terminal', 3)
(692, 254719, 'not terminal', 2)
(816, 541377, 'not terminal', 2)
(944, 420858, 'not terminal', 1)
(997, 420335, 'not terminal', 2)
(1039, 253620, 'not terminal', 2)
(1564, 537105, 'not terminal', 1)
(1652, 499542, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 106
First 10 period coefficients: [1, 0, 10, 30, 294, 1680, 13510, 94920, 747670, 5718720]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(354, 429566, 'not terminal', 4)
(593, 515561, 'not terminal', 3)
Maximum Picard rank: 4; minimum Picard rank: 3
================================================================================
Period sequence 107
First 10 period coefficients: [1, 0, 6, 30, 186, 1380, 10230, 78540, 620970, 5020680]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(400, 255713, 'not terminal', 3)
(652, 425387, 'not terminal', 2)
(655, 425293, 'not terminal', 2)
(656, 425394, 'not terminal', 2)
(723, 254611, 'not terminal', 3)
(729, 674687, 'terminal', 3)
(731, 674684, 'terminal', 3)
(924, 420855, 'not terminal', 1)
(979, 420517, 'not terminal', 2)
(984, 420477, 'not terminal', 2)
(1004, 424124, 'not terminal', 3)
(1008, 424582, 'not terminal', 3)
(1068, 253963, 'not terminal', 2)
(1078, 253196, 'not terminal', 3)
(1087, 674628, 'not terminal', 2)
(1294, 413055, 'not terminal', 1)
(1296, 413172, 'not terminal', 1)
(1401, 245979, 'not terminal', 1)
(1403, 246125, 'not terminal', 1)
(1451, 251489, 'not terminal', 2)
(1458, 251556, 'not terminal', 2)
(1464, 251542, 'not terminal', 2)
(1476, 672929, 'not terminal', 1)
(1479, 674196, 'not terminal', 2)
(1488, 674246, 'not terminal', 2)
(1516, 61938, 'not terminal', 2)
(1518, 61940, 'not terminal', 2)
(1713, 402294, 'not terminal', 1)
(1732, 401340, 'not terminal', 1)
(1753, 400224, 'not terminal', 2)
(1760, 400262, 'not terminal', 2)
(1768, 400139, 'not terminal', 2)
(1802, 235719, 'not terminal', 1)
(1847, 235606, 'not terminal', 1)
(1849, 236213, 'not terminal', 1)
(1864, 245247, 'not terminal', 2)
(1917, 672302, 'not terminal', 2)
(2142, 388437, 'not terminal', 1)
(2192, 222883, 'not terminal', 1)
(2229, 221494, 'not terminal', 1)
(2243, 222610, 'not terminal', 1)
(2267, 234442, 'not terminal', 2)
(2282, 662750, 'not terminal', 1)
(2284, 662742, 'not terminal', 1)
(2490, 371033, 'not terminal', 1)
(2512, 369371, 'not terminal', 1)
(2535, 370608, 'not terminal', 1)
(2575, 205959, 'not terminal', 1)
(2622, 203149, 'not terminal', 1)
(2785, 473158, 'not terminal', 1)
(2865, 352782, 'not terminal', 1)
(2869, 353583, 'not terminal', 1)
(2876, 350427, 'not terminal', 1)
(2946, 179890, 'not terminal', 1)
(2947, 181674, 'not terminal', 1)
(3169, 331684, 'not terminal', 1)
(3231, 165809, 'not terminal', 1)
(3379, 456347, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 108
First 10 period coefficients: [1, 0, 4, 0, 60, 60, 1120, 1680, 24220, 52920]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(52, 520054, 'not terminal', 2)
(257, 518653, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 109
First 10 period coefficients: [1, 0, 22, 126, 1722, 18780, 236470, 2998380, 39440170, 528743880]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1325, 413263, 'not terminal', 2)
(1366, 412323, 'not terminal', 2)
(1819, 236593, 'not terminal', 2)
(1836, 236602, 'not terminal', 2)
(2127, 388474, 'not terminal', 2)
(2182, 223087, 'not terminal', 1)
(2217, 222793, 'not terminal', 2)
(2491, 372074, 'not terminal', 2)
(2630, 652784, 'not terminal', 1)
(2828, 355133, 'not terminal', 1)
(2911, 186035, 'not terminal', 1)
(3210, 165592, 'not terminal', 1)
(3471, 145029, 'not terminal', 1)
(3638, 306682, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 110
First 10 period coefficients: [1, 0, 10, 30, 270, 1620, 11710, 83580, 610750, 4569600]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(278, 518139, 'not terminal', 3)
Maximum Picard rank: 3; minimum Picard rank: 3
================================================================================
Period sequence 111
First 10 period coefficients: [1, 0, 4, 12, 84, 420, 2380, 15120, 90580, 580440]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(161, 430078, 'not terminal', 2)
(324, 429054, 'not terminal', 2)
(385, 254897, 'not terminal', 2)
(554, 516542, 'not terminal', 2)
(945, 420883, 'not terminal', 1)
(998, 420039, 'not terminal', 2)
(1840, 236250, 'not terminal', 1)
(2537, 370613, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 112
First 10 period coefficients: [1, 0, 6, 18, 138, 780, 5370, 36120, 253050, 1811880]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(181, 429933, 'not terminal', 3)
(315, 429012, 'not terminal', 2)
(370, 254883, 'not terminal', 2)
(401, 255726, 'not terminal', 3)
(419, 62084, 'terminal', 3)
(421, 62070, 'terminal', 3)
(422, 62074, 'terminal', 3)
(560, 516725, 'not terminal', 2)
(563, 516792, 'not terminal', 2)
(597, 515076, 'not terminal', 3)
(676, 427481, 'not terminal', 3)
(697, 61978, 'not terminal', 2)
(698, 61971, 'not terminal', 2)
(711, 61979, 'not terminal', 2)
(712, 254701, 'not terminal', 2)
(716, 254572, 'not terminal', 3)
(718, 254610, 'not terminal', 3)
(735, 674677, 'terminal', 3)
(923, 420856, 'not terminal', 1)
(953, 419976, 'not terminal', 2)
(1031, 251669, 'not terminal', 1)
(1056, 253766, 'not terminal', 2)
(1060, 253828, 'not terminal', 2)
(1065, 253949, 'not terminal', 2)
(1067, 253992, 'not terminal', 2)
(1076, 253194, 'not terminal', 3)
(1090, 674596, 'not terminal', 2)
(1107, 674543, 'not terminal', 3)
(1248, 506601, 'not terminal', 2)
(1258, 506758, 'not terminal', 2)
(1288, 413046, 'not terminal', 1)
(1355, 409734, 'not terminal', 2)
(1377, 412355, 'not terminal', 2)
(1381, 417933, 'not terminal', 3)
(1407, 246131, 'not terminal', 1)
(1432, 246200, 'not terminal', 1)
(1438, 251091, 'not terminal', 2)
(1443, 250962, 'not terminal', 2)
(1467, 251114, 'not terminal', 2)
(1490, 674237, 'not terminal', 1)
(1506, 673876, 'not terminal', 2)
(1508, 674052, 'not terminal', 2)
(1626, 499967, 'not terminal', 1)
(1647, 500332, 'not terminal', 1)
(1731, 402183, 'not terminal', 1)
(1743, 401404, 'not terminal', 1)
(1758, 397760, 'not terminal', 2)
(1765, 400086, 'not terminal', 2)
(1808, 236266, 'not terminal', 1)
(1809, 236272, 'not terminal', 1)
(1837, 236224, 'not terminal', 1)
(1842, 236237, 'not terminal', 1)
(1843, 236397, 'not terminal', 1)
(1889, 672831, 'not terminal', 1)
(2124, 387335, 'not terminal', 1)
(2136, 386225, 'not terminal', 1)
(2158, 388450, 'not terminal', 1)
(2231, 222619, 'not terminal', 1)
(2239, 220654, 'not terminal', 1)
(2448, 479576, 'not terminal', 2)
(2515, 370866, 'not terminal', 1)
(2526, 368691, 'not terminal', 1)
(2607, 201900, 'not terminal', 1)
(2609, 202559, 'not terminal', 1)
(2612, 204861, 'not terminal', 1)
(2793, 473274, 'not terminal', 1)
(2801, 471870, 'not terminal', 1)
(2864, 352837, 'not terminal', 1)
(2875, 352732, 'not terminal', 1)
(3115, 463532, 'not terminal', 1)
(3186, 331214, 'not terminal', 1)
(3441, 315887, 'not terminal', 1)
(3563, 525369, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 113
First 10 period coefficients: [1, 0, 2, 6, 30, 120, 470, 2520, 10990, 57120]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(25, 520137, 'smooth', 3)
(72, 430418, 'terminal', 3)
(166, 430038, 'not terminal', 2)
(375, 254864, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 114
First 10 period coefficients: [1, 0, 10, 42, 342, 2640, 21250, 180600, 1562470, 13851600]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(284, 518146, 'not terminal', 3)
(358, 429573, 'not terminal', 4)
(672, 254736, 'not terminal', 3)
(902, 510714, 'not terminal', 3)
(1006, 424645, 'not terminal', 3)
(1082, 253449, 'not terminal', 3)
(1165, 538641, 'not terminal', 2)
(1247, 505173, 'not terminal', 2)
(1353, 412315, 'not terminal', 2)
(1798, 235966, 'not terminal', 1)
(2304, 668736, 'not terminal', 1)
(2608, 203259, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 115
First 10 period coefficients: [1, 0, 6, 12, 90, 420, 2040, 12600, 61530, 381360]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(110, 544033, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 116
First 10 period coefficients: [1, 0, 54, 492, 10122, 164160, 3054600, 56395080, 1077591690, 20861473920]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(770, 546851, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 117
First 10 period coefficients: [1, 0, 4, 12, 36, 240, 940, 4620, 25060, 119280]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(60, 519932, 'not terminal', 3)
(124, 519618, 'not terminal', 2)
(847, 513090, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 118
First 10 period coefficients: [1, 0, 6, 18, 90, 540, 2850, 16380, 100170, 594720]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(112, 544024, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 119
First 10 period coefficients: [1, 0, 4, 18, 84, 540, 3190, 20160, 130900, 859320]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(212, 255879, 'terminal', 3)
(322, 429043, 'not terminal', 2)
(368, 254896, 'not terminal', 2)
(391, 255698, 'not terminal', 3)
(416, 62073, 'terminal', 3)
(417, 62079, 'terminal', 3)
(614, 425453, 'not terminal', 1)
(623, 425176, 'not terminal', 2)
(639, 425388, 'not terminal', 2)
(647, 425378, 'not terminal', 2)
(648, 425367, 'not terminal', 2)
(695, 254728, 'not terminal', 2)
(707, 61982, 'not terminal', 2)
(715, 254612, 'not terminal', 3)
(782, 541692, 'not terminal', 1)
(949, 420897, 'not terminal', 1)
(971, 420107, 'not terminal', 2)
(999, 420480, 'not terminal', 2)
(1057, 253915, 'not terminal', 2)
(1061, 253819, 'not terminal', 2)
(1091, 674595, 'not terminal', 2)
(1092, 674586, 'not terminal', 2)
(1315, 413048, 'not terminal', 1)
(1337, 412983, 'not terminal', 1)
(1357, 412094, 'not terminal', 2)
(1358, 412182, 'not terminal', 2)
(1375, 412044, 'not terminal', 2)
(1442, 250852, 'not terminal', 2)
(1450, 251528, 'not terminal', 2)
(1733, 401407, 'not terminal', 1)
(1741, 402346, 'not terminal', 1)
(1839, 235629, 'not terminal', 1)
(2061, 491277, 'not terminal', 1)
(2174, 384994, 'not terminal', 2)
(2520, 370274, 'not terminal', 1)
(2527, 370583, 'not terminal', 1)
(2789, 472064, 'not terminal', 1)
(3381, 456371, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 120
First 10 period coefficients: [1, 0, 4, 6, 36, 180, 490, 3780, 11620, 74760]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(57, 519925, 'not terminal', 3)
Maximum Picard rank: 3; minimum Picard rank: 3
================================================================================
Period sequence 121
First 10 period coefficients: [1, 0, 10, 30, 270, 1860, 13510, 110880, 862750, 7215600]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(267, 518587, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 122
First 10 period coefficients: [1, 0, 8, 24, 216, 1320, 10160, 74760, 584920, 4598160]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(349, 428561, 'not terminal', 3)
(397, 255717, 'not terminal', 3)
(621, 425267, 'not terminal', 2)
(658, 425329, 'not terminal', 2)
(679, 254752, 'not terminal', 3)
(721, 254615, 'not terminal', 3)
(725, 254633, 'not terminal', 3)
(740, 674662, 'terminal', 4)
(900, 512863, 'not terminal', 2)
(1038, 253947, 'not terminal', 2)
(1042, 253678, 'not terminal', 2)
(1071, 253877, 'not terminal', 2)
(1079, 253437, 'not terminal', 3)
(1083, 253439, 'not terminal', 3)
(1105, 674536, 'not terminal', 3)
(1230, 505191, 'not terminal', 2)
(1266, 503525, 'not terminal', 3)
(1313, 413104, 'not terminal', 1)
(1342, 412982, 'not terminal', 1)
(1352, 411509, 'not terminal', 2)
(1354, 411717, 'not terminal', 2)
(1448, 251029, 'not terminal', 2)
(1470, 249647, 'not terminal', 3)
(1497, 673893, 'not terminal', 2)
(1507, 674094, 'not terminal', 2)
(1523, 61915, 'not terminal', 2)
(1767, 400227, 'not terminal', 2)
(1796, 235986, 'not terminal', 1)
(1845, 235643, 'not terminal', 1)
(1857, 244786, 'not terminal', 2)
(1859, 242713, 'not terminal', 2)
(1913, 672076, 'not terminal', 2)
(2074, 488600, 'not terminal', 2)
(2157, 387964, 'not terminal', 1)
(2160, 387220, 'not terminal', 1)
(2173, 382516, 'not terminal', 2)
(2178, 383090, 'not terminal', 2)
(2203, 220604, 'not terminal', 1)
(2240, 221492, 'not terminal', 1)
(2316, 668872, 'not terminal', 1)
(2321, 667186, 'not terminal', 2)
(2781, 472391, 'not terminal', 1)
(2797, 472610, 'not terminal', 1)
(2847, 349759, 'not terminal', 1)
(2877, 352788, 'not terminal', 1)
(3176, 331526, 'not terminal', 1)
(3188, 332295, 'not terminal', 1)
(3188, 332295, 'not terminal', 1)
(3787, 446396, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 123
First 10 period coefficients: [1, 0, 6, 12, 90, 420, 2400, 13860, 81690, 494760]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(182, 429927, 'not terminal', 3)
(188, 429899, 'not terminal', 3)
(581, 516368, 'not terminal', 2)
(622, 425119, 'not terminal', 2)
(632, 425325, 'not terminal', 2)
(1144, 539508, 'not terminal', 1)
(1740, 401280, 'not terminal', 1)
(2428, 482266, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 124
First 10 period coefficients: [1, 0, 20, 102, 1236, 11640, 125210, 1349040, 14965300, 168999600]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(506, 542503, 'not terminal', 3)
(803, 541393, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 125
First 10 period coefficients: [1, 0, 6, 12, 90, 420, 2040, 13020, 61530, 404040]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(143, 519318, 'not terminal', 3)
(271, 518715, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 126
First 10 period coefficients: [1, 0, 6, 18, 138, 720, 5010, 32340, 222810, 1547280]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(147, 519309, 'not terminal', 3)
(274, 518730, 'not terminal', 2)
(398, 255711, 'not terminal', 3)
(600, 515611, 'not terminal', 3)
(678, 254743, 'not terminal', 3)
(970, 419977, 'not terminal', 2)
(1170, 538757, 'not terminal', 2)
(1839, 235629, 'not terminal', 1)
(2527, 370583, 'not terminal', 1)
(3381, 456371, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 127
First 10 period coefficients: [1, 0, 20, 114, 1380, 14340, 164630, 1937040, 23454340, 290217480]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(508, 542497, 'not terminal', 3)
(893, 512906, 'not terminal', 2)
(1231, 506816, 'not terminal', 2)
(1304, 413259, 'not terminal', 2)
(1367, 412314, 'not terminal', 2)
(1578, 536449, 'not terminal', 2)
(1608, 500349, 'not terminal', 2)
(1664, 498868, 'not terminal', 2)
(2465, 372723, 'not terminal', 1)
(2904, 185509, 'not terminal', 1)
(3146, 337637, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 128
First 10 period coefficients: [1, 0, 10, 66, 558, 5400, 54010, 548520, 5812030, 62519520]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(568, 516761, 'not terminal', 2)
(955, 420626, 'not terminal', 2)
(1020, 251682, 'not terminal', 2)
(1370, 412350, 'not terminal', 2)
(1397, 246249, 'not terminal', 2)
(1609, 499963, 'not terminal', 1)
(1665, 498855, 'not terminal', 2)
(1712, 402267, 'not terminal', 2)
(1759, 400520, 'not terminal', 2)
(1762, 400554, 'not terminal', 2)
(1784, 236686, 'not terminal', 1)
(2184, 222912, 'not terminal', 1)
(2631, 652808, 'not terminal', 1)
(2822, 355387, 'not terminal', 1)
(2891, 185547, 'not terminal', 1)
(3205, 166027, 'not terminal', 1)
(3221, 165882, 'not terminal', 1)
(3594, 449995, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 129
First 10 period coefficients: [1, 0, 10, 36, 318, 2160, 17200, 136500, 1124830, 9460080]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(357, 429572, 'not terminal', 4)
(592, 515479, 'not terminal', 3)
(671, 254742, 'not terminal', 3)
(901, 510711, 'not terminal', 3)
(965, 420475, 'not terminal', 2)
(1005, 424631, 'not terminal', 3)
(1796, 235986, 'not terminal', 1)
(2203, 220604, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 130
First 10 period coefficients: [1, 0, 4, 6, 60, 180, 1210, 5040, 30940, 150360]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(58, 519921, 'not terminal', 3)
(178, 429956, 'not terminal', 3)
(575, 516556, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 131
First 10 period coefficients: [1, 0, 8, 18, 168, 840, 5750, 37380, 250600, 1758960]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(151, 519314, 'not terminal', 3)
(196, 430351, 'not terminal', 4)
(558, 516371, 'not terminal', 2)
(675, 427137, 'not terminal', 3)
(894, 512481, 'not terminal', 2)
(959, 419682, 'not terminal', 2)
(1466, 250714, 'not terminal', 2)
(2153, 387094, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 132
First 10 period coefficients: [1, 0, 10, 36, 294, 2040, 15040, 118020, 924070, 7524720]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(281, 518136, 'not terminal', 3)
(355, 429564, 'not terminal', 4)
(594, 515566, 'not terminal', 3)
(1255, 505194, 'not terminal', 2)
(1350, 411409, 'not terminal', 2)
Maximum Picard rank: 4; minimum Picard rank: 2
================================================================================
Period sequence 133
First 10 period coefficients: [1, 0, 6, 6, 90, 180, 1950, 5460, 49770, 175560]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(65, 519911, 'not terminal', 3)
(309, 428988, 'not terminal', 2)
(310, 428887, 'not terminal', 2)
(533, 516916, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 134
First 10 period coefficients: [1, 0, 14, 60, 666, 5640, 56120, 558600, 5774650, 60794160]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(489, 543400, 'not terminal', 2)
(578, 516789, 'not terminal', 2)
(1208, 507488, 'not terminal', 1)
(1285, 413275, 'not terminal', 1)
(1424, 246062, 'not terminal', 1)
(1988, 534498, 'not terminal', 1)
(2044, 491126, 'not terminal', 1)
(2051, 491147, 'not terminal', 1)
(2104, 387010, 'not terminal', 1)
(2328, 61317, 'not terminal', 1)
(2970, 638861, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 135
First 10 period coefficients: [1, 0, 20, 108, 1284, 12720, 139340, 1560720, 17923780, 210349440]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(447, 547199, 'not terminal', 2)
(507, 542502, 'not terminal', 3)
(511, 542506, 'not terminal', 3)
(876, 512861, 'not terminal', 2)
(1175, 539007, 'not terminal', 2)
(1245, 506554, 'not terminal', 2)
(1988, 534498, 'not terminal', 1)
(2044, 491126, 'not terminal', 1)
(2051, 491147, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 136
First 10 period coefficients: [1, 0, 20, 102, 1284, 12180, 136010, 1501080, 17255140, 201394200]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(510, 542507, 'not terminal', 3)
(877, 512853, 'not terminal', 2)
(1174, 539006, 'not terminal', 2)
(1261, 506549, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 137
First 10 period coefficients: [1, 0, 4, 0, 36, 60, 400, 1680, 4900, 37800]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(14, 544345, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 138
First 10 period coefficients: [1, 0, 6, 12, 138, 540, 4200, 23520, 167370, 1061760]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(115, 544025, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 139
First 10 period coefficients: [1, 0, 6, 12, 114, 360, 3120, 12600, 97650, 472080]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(111, 544034, 'not terminal', 2)
(146, 519320, 'not terminal', 3)
(798, 541690, 'not terminal', 1)
(867, 513115, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 140
First 10 period coefficients: [1, 0, 6, 18, 90, 600, 2850, 18900, 110250, 685440]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(145, 519319, 'not terminal', 3)
(192, 430369, 'not terminal', 4)
(273, 518708, 'not terminal', 2)
(581, 516368, 'not terminal', 2)
(632, 425325, 'not terminal', 2)
(1740, 401280, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 141
First 10 period coefficients: [1, 0, 54, 510, 10170, 168840, 3116430, 58015440, 1109363850, 21561202320]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(769, 546852, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 142
First 10 period coefficients: [1, 0, 6, 6, 90, 240, 1950, 8400, 53130, 288960]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(61, 519916, 'not terminal', 3)
(84, 430514, 'smooth', 4)
(190, 429935, 'not terminal', 3)
(314, 428886, 'not terminal', 2)
(318, 429005, 'not terminal', 2)
(376, 254876, 'not terminal', 2)
(633, 425104, 'not terminal', 2)
(636, 425280, 'not terminal', 2)
(848, 513225, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 143
First 10 period coefficients: [1, 0, 10, 48, 390, 3240, 27820, 249480, 2298310, 21599760]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(285, 518148, 'not terminal', 3)
(673, 254766, 'not terminal', 3)
(985, 420534, 'not terminal', 2)
(1003, 424844, 'not terminal', 3)
(1050, 253990, 'not terminal', 3)
(1264, 503704, 'not terminal', 3)
(1382, 418768, 'not terminal', 3)
(1656, 497346, 'not terminal', 2)
(1706, 401283, 'not terminal', 1)
(2125, 387330, 'not terminal', 1)
(2275, 662648, 'not terminal', 1)
(2912, 186243, 'not terminal', 1)
(3652, 299833, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 144
First 10 period coefficients: [1, 0, 8, 30, 240, 1740, 13130, 106680, 862960, 7248360]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(591, 516764, 'not terminal', 2)
(653, 425383, 'not terminal', 2)
(664, 425403, 'not terminal', 2)
(703, 61970, 'not terminal', 2)
(722, 254624, 'not terminal', 3)
(737, 674680, 'terminal', 3)
(924, 420855, 'not terminal', 1)
(1016, 251653, 'not terminal', 1)
(1051, 253840, 'not terminal', 2)
(1069, 253996, 'not terminal', 2)
(1070, 253984, 'not terminal', 2)
(1073, 253879, 'not terminal', 2)
(1103, 674597, 'not terminal', 2)
(1106, 674530, 'not terminal', 3)
(1113, 61959, 'terminal', 3)
(1380, 412326, 'not terminal', 2)
(1404, 246108, 'not terminal', 1)
(1421, 246161, 'not terminal', 1)
(1434, 251070, 'not terminal', 2)
(1441, 251574, 'not terminal', 2)
(1456, 251473, 'not terminal', 2)
(1471, 249313, 'not terminal', 3)
(1476, 672929, 'not terminal', 1)
(1479, 674196, 'not terminal', 2)
(1480, 674170, 'not terminal', 2)
(1493, 674238, 'not terminal', 1)
(1513, 673689, 'not terminal', 3)
(1516, 61938, 'not terminal', 2)
(1732, 401340, 'not terminal', 1)
(1755, 400493, 'not terminal', 2)
(1769, 400552, 'not terminal', 2)
(1798, 235966, 'not terminal', 1)
(1800, 236110, 'not terminal', 1)
(1805, 236353, 'not terminal', 1)
(1827, 236416, 'not terminal', 1)
(1846, 236262, 'not terminal', 1)
(1849, 236213, 'not terminal', 1)
(1864, 245247, 'not terminal', 2)
(1869, 242735, 'not terminal', 2)
(1892, 672913, 'not terminal', 1)
(1893, 672826, 'not terminal', 1)
(1915, 671859, 'not terminal', 2)
(1934, 61770, 'not terminal', 1)
(2109, 387399, 'not terminal', 1)
(2192, 222883, 'not terminal', 1)
(2207, 220645, 'not terminal', 1)
(2229, 221494, 'not terminal', 1)
(2244, 222612, 'not terminal', 1)
(2254, 231107, 'not terminal', 2)
(2259, 234759, 'not terminal', 2)
(2284, 662742, 'not terminal', 1)
(2304, 668736, 'not terminal', 1)
(2319, 669046, 'not terminal', 1)
(2333, 61316, 'not terminal', 1)
(2513, 370588, 'not terminal', 1)
(2531, 370638, 'not terminal', 1)
(2598, 204086, 'not terminal', 1)
(2608, 203259, 'not terminal', 1)
(2622, 203149, 'not terminal', 1)
(2674, 662260, 'not terminal', 1)
(2813, 467882, 'not terminal', 2)
(2876, 350427, 'not terminal', 1)
(2946, 179890, 'not terminal', 1)
(2948, 181701, 'not terminal', 1)
(2955, 181632, 'not terminal', 1)
(3002, 649478, 'not terminal', 1)
(3005, 649168, 'not terminal', 1)
(3169, 331684, 'not terminal', 1)
(3428, 314752, 'not terminal', 1)
(3658, 303278, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 145
First 10 period coefficients: [1, 0, 8, 24, 192, 1200, 8360, 60900, 448000, 3403680]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(339, 428567, 'not terminal', 3)
(406, 255715, 'not terminal', 3)
(657, 425356, 'not terminal', 2)
(938, 420790, 'not terminal', 1)
(967, 420277, 'not terminal', 2)
(1043, 253688, 'not terminal', 2)
(1255, 505194, 'not terminal', 2)
(1350, 411409, 'not terminal', 2)
(1889, 672831, 'not terminal', 1)
(2607, 201900, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 146
First 10 period coefficients: [1, 0, 14, 66, 762, 6960, 73490, 780360, 8578570, 96096000]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(931, 420888, 'not terminal', 1)
(996, 420620, 'not terminal', 2)
(1317, 413138, 'not terminal', 1)
(1356, 412319, 'not terminal', 2)
(1428, 246222, 'not terminal', 1)
(1436, 251596, 'not terminal', 2)
(1500, 674146, 'not terminal', 2)
(1719, 402387, 'not terminal', 1)
(1772, 408682, 'not terminal', 3)
(1787, 236658, 'not terminal', 1)
(1828, 236366, 'not terminal', 1)
(1860, 245700, 'not terminal', 2)
(1879, 669463, 'not terminal', 1)
(1899, 672867, 'not terminal', 2)
(1908, 672614, 'not terminal', 2)
(1910, 672420, 'not terminal', 2)
(1930, 61802, 'not terminal', 2)
(1937, 61725, 'not terminal', 3)
(2165, 382978, 'not terminal', 2)
(2166, 385006, 'not terminal', 2)
(2170, 385085, 'not terminal', 2)
(2195, 223025, 'not terminal', 1)
(2268, 228178, 'not terminal', 3)
(2287, 662764, 'not terminal', 1)
(2295, 662775, 'not terminal', 1)
(2320, 667828, 'not terminal', 2)
(2325, 667896, 'not terminal', 2)
(2329, 61322, 'not terminal', 1)
(2334, 61355, 'not terminal', 1)
(2350, 12611, 'not terminal', 1)
(2465, 372723, 'not terminal', 1)
(2478, 370703, 'not terminal', 1)
(2541, 364781, 'not terminal', 2)
(2558, 205468, 'not terminal', 1)
(2589, 204381, 'not terminal', 1)
(2599, 203231, 'not terminal', 1)
(2619, 202590, 'not terminal', 2)
(2621, 202510, 'not terminal', 1)
(2624, 219192, 'not terminal', 2)
(2626, 219121, 'not terminal', 2)
(2642, 652718, 'not terminal', 1)
(2685, 59847, 'not terminal', 1)
(2691, 60018, 'not terminal', 1)
(2696, 12518, 'not terminal', 1)
(2696, 12518, 'not terminal', 1)
(2843, 353483, 'not terminal', 1)
(2904, 185509, 'not terminal', 1)
(2916, 186255, 'not terminal', 1)
(2928, 181714, 'not terminal', 1)
(3015, 56731, 'not terminal', 1)
(3017, 57061, 'not terminal', 1)
(3021, 57254, 'not terminal', 1)
(3090, 464068, 'not terminal', 1)
(3122, 460182, 'not terminal', 2)
(3146, 337637, 'not terminal', 1)
(3194, 328289, 'not terminal', 2)
(3203, 164443, 'not terminal', 1)
(3233, 161602, 'not terminal', 1)
(3239, 160242, 'not terminal', 1)
(3240, 157292, 'not terminal', 1)
(3254, 160747, 'not terminal', 1)
(3271, 624138, 'not terminal', 1)
(3283, 624083, 'not terminal', 1)
(3284, 624143, 'not terminal', 1)
(3301, 51708, 'not terminal', 1)
(3301, 51708, 'not terminal', 1)
(3423, 320054, 'not terminal', 1)
(3425, 316454, 'not terminal', 1)
(3458, 144273, 'not terminal', 1)
(3714, 592519, 'not terminal', 1)
(3840, 100388, 'not terminal', 1)
(3906, 442435, 'not terminal', 1)
(4128, 266401, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 147
First 10 period coefficients: [1, 0, 8, 18, 192, 960, 7550, 49980, 374080, 2741760]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(405, 255693, 'not terminal', 3)
(408, 255339, 'not terminal', 4)
(425, 62054, 'terminal', 4)
(650, 425384, 'not terminal', 2)
(660, 425265, 'not terminal', 2)
(680, 254750, 'not terminal', 3)
(720, 254619, 'not terminal', 3)
(903, 508945, 'not terminal', 3)
(967, 420277, 'not terminal', 2)
(1001, 420468, 'not terminal', 2)
(1007, 424144, 'not terminal', 3)
(1031, 251669, 'not terminal', 1)
(1056, 253766, 'not terminal', 2)
(1066, 253989, 'not terminal', 2)
(1090, 674596, 'not terminal', 2)
(1291, 413178, 'not terminal', 1)
(1359, 411745, 'not terminal', 2)
(1378, 412310, 'not terminal', 2)
(1398, 245921, 'not terminal', 1)
(1407, 246131, 'not terminal', 1)
(1506, 673876, 'not terminal', 2)
(1681, 497571, 'not terminal', 2)
(1707, 401566, 'not terminal', 1)
(1731, 402183, 'not terminal', 1)
(1797, 235630, 'not terminal', 1)
(1809, 236272, 'not terminal', 1)
(1843, 236397, 'not terminal', 1)
(1889, 672831, 'not terminal', 1)
(2239, 220654, 'not terminal', 1)
(2526, 368691, 'not terminal', 1)
(2607, 201900, 'not terminal', 1)
(2801, 471870, 'not terminal', 1)
Maximum Picard rank: 4; minimum Picard rank: 1
================================================================================
Period sequence 148
First 10 period coefficients: [1, 0, 2, 18, 102, 420, 2810, 21000, 129430, 813960]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(142, 519273, 'not terminal', 3)
(185, 429953, 'not terminal', 3)
(202, 255738, 'terminal', 3)
(307, 428993, 'not terminal', 2)
(685, 254013, 'not terminal', 2)
(948, 420667, 'not terminal', 1)
(1012, 251690, 'not terminal', 1)
(1339, 412752, 'not terminal', 1)
(1389, 246279, 'not terminal', 1)
(1718, 401839, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 149
First 10 period coefficients: [1, 0, 10, 36, 270, 1980, 13240, 105420, 783790, 6209280]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(280, 518145, 'not terminal', 3)
Maximum Picard rank: 3; minimum Picard rank: 3
================================================================================
Period sequence 150
First 10 period coefficients: [1, 0, 4, 6, 60, 120, 1210, 3360, 27580, 97440]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(59, 519920, 'not terminal', 3)
(83, 430516, 'smooth', 4)
(268, 518644, 'not terminal', 2)
(310, 428887, 'not terminal', 2)
Maximum Picard rank: 4; minimum Picard rank: 2
================================================================================
Period sequence 151
First 10 period coefficients: [1, 0, 24, 156, 2280, 27960, 387060, 5450760, 79246440, 1175608560]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1618, 500350, 'not terminal', 2)
(1691, 402539, 'not terminal', 1)
(1724, 402440, 'not terminal', 2)
(1822, 236592, 'not terminal', 2)
(2004, 532845, 'not terminal', 3)
(2221, 222798, 'not terminal', 2)
(2223, 222803, 'not terminal', 2)
(2269, 662845, 'not terminal', 1)
(2297, 662835, 'not terminal', 2)
(2300, 662770, 'not terminal', 1)
(2313, 669391, 'not terminal', 2)
(2393, 531049, 'not terminal', 2)
(2492, 372059, 'not terminal', 2)
(2524, 372151, 'not terminal', 1)
(2543, 367025, 'not terminal', 2)
(2565, 205541, 'not terminal', 1)
(2578, 205968, 'not terminal', 1)
(2602, 205096, 'not terminal', 2)
(2639, 652759, 'not terminal', 2)
(2806, 470079, 'not terminal', 2)
(2897, 186448, 'not terminal', 1)
(2926, 184688, 'not terminal', 2)
(2941, 184793, 'not terminal', 2)
(2963, 639872, 'not terminal', 1)
(2969, 639834, 'not terminal', 1)
(3010, 53085, 'not terminal', 1)
(3140, 337773, 'not terminal', 1)
(3178, 335643, 'not terminal', 2)
(3266, 625241, 'not terminal', 1)
(3347, 525733, 'not terminal', 2)
(3448, 147317, 'not terminal', 1)
(3459, 145359, 'not terminal', 1)
(3465, 146307, 'not terminal', 1)
(3466, 145002, 'not terminal', 1)
(3507, 610446, 'not terminal', 1)
(3626, 305770, 'not terminal', 1)
(3683, 126503, 'not terminal', 1)
(3767, 446903, 'not terminal', 1)
(3769, 444829, 'not terminal', 1)
(3834, 111798, 'not terminal', 1)
(3929, 283324, 'not terminal', 1)
(3947, 283006, 'not terminal', 1)
(4109, 436777, 'not terminal', 1)
(4241, 520868, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 152
First 10 period coefficients: [1, 0, 2, 6, 54, 180, 830, 4620, 26950, 140280]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(63, 519928, 'not terminal', 3)
(75, 430417, 'terminal', 3)
(138, 519610, 'not terminal', 2)
(362, 254875, 'not terminal', 2)
(610, 425446, 'not terminal', 1)
(1209, 507569, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 153
First 10 period coefficients: [1, 0, 10, 30, 294, 1620, 13150, 89040, 697270, 5174400]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(279, 518133, 'not terminal', 3)
Maximum Picard rank: 3; minimum Picard rank: 3
================================================================================
Period sequence 154
First 10 period coefficients: [1, 0, 56, 528, 11112, 189180, 3666440, 71382360, 1438216360, 29503594680]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(1604, 500379, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 155
First 10 period coefficients: [1, 0, 4, 12, 60, 240, 1660, 6720, 44380, 225120]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(134, 519650, 'not terminal', 2)
(171, 430081, 'not terminal', 2)
(301, 429079, 'not terminal', 1)
(798, 541690, 'not terminal', 1)
(867, 513115, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================
Period sequence 156
First 10 period coefficients: [1, 0, 20, 96, 1236, 10800, 119360, 1226400, 13523860, 147819840]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(452, 547200, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 157
First 10 period coefficients: [1, 0, 20, 102, 1188, 11400, 117290, 1262520, 13582660, 150613680]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(451, 547197, 'not terminal', 2)
Maximum Picard rank: 2; minimum Picard rank: 2
================================================================================
Period sequence 158
First 10 period coefficients: [1, 0, 2, 12, 30, 180, 920, 4200, 22750, 121800]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(76, 430423, 'terminal', 3)
(177, 429952, 'not terminal', 3)
(204, 255870, 'terminal', 3)
(364, 254860, 'not terminal', 2)
(693, 254721, 'not terminal', 2)
(849, 513187, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 159
First 10 period coefficients: [1, 0, 10, 30, 318, 2040, 17470, 139440, 1193710, 10254720]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(342, 428500, 'not terminal', 3)
(556, 516514, 'not terminal', 2)
(598, 515609, 'not terminal', 3)
(669, 254772, 'not terminal', 3)
(681, 254751, 'not terminal', 3)
(704, 61974, 'not terminal', 3)
(986, 420318, 'not terminal', 2)
(1037, 251665, 'not terminal', 2)
(1172, 538681, 'not terminal', 2)
(1459, 251332, 'not terminal', 2)
(1480, 674170, 'not terminal', 2)
(1649, 499995, 'not terminal', 1)
(1670, 496119, 'not terminal', 2)
(1746, 398434, 'not terminal', 2)
(1747, 398237, 'not terminal', 2)
(1847, 235606, 'not terminal', 1)
(2197, 222907, 'not terminal', 1)
(2333, 61316, 'not terminal', 1)
(2535, 370608, 'not terminal', 1)
(2836, 355386, 'not terminal', 1)
(3002, 649478, 'not terminal', 1)
(3379, 456347, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
================================================================================
Period sequence 160
First 10 period coefficients: [1, 0, 4, 18, 60, 480, 2470, 14280, 94780, 564480]
I do not know the PF operator for this sequence
This sequence has a terminal toric Gorenstein Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(62, 519918, 'not terminal', 3)
(211, 255878, 'terminal', 3)
(325, 429059, 'not terminal', 2)
(340, 428572, 'not terminal', 3)
(382, 254890, 'not terminal', 2)
(392, 255687, 'not terminal', 3)
(418, 62077, 'terminal', 3)
(596, 515083, 'not terminal', 3)
(612, 425445, 'not terminal', 1)
(638, 425315, 'not terminal', 2)
(708, 61983, 'not terminal', 2)
(709, 254716, 'not terminal', 2)
(969, 420582, 'not terminal', 2)
(1028, 251655, 'not terminal', 1)
(1052, 253864, 'not terminal', 2)
(1244, 506786, 'not terminal', 2)
(1331, 412937, 'not terminal', 1)
(1838, 235624, 'not terminal', 1)
(2042, 491423, 'not terminal', 1)
(2154, 387777, 'not terminal', 1)
Maximum Picard rank: 3; minimum Picard rank: 1
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Period sequence 161
First 10 period coefficients: [1, 0, 32, 246, 4224, 61080, 998330, 16569000, 284216800, 4971393840]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(2189, 223123, 'not terminal', 1)
(3007, 53123, 'not terminal', 1)
(3528, 41156, 'not terminal', 1)
(3850, 585038, 'not terminal', 1)
Maximum Picard rank: 1; minimum Picard rank: 1
================================================================================
Period sequence 162
First 10 period coefficients: [1, 0, 20, 96, 1236, 11100, 122240, 1291920, 14384020, 161163240]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(504, 542501, 'not terminal', 3)
(815, 541386, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 163
First 10 period coefficients: [1, 0, 2, 0, 30, 60, 380, 840, 5950, 22680]
I do not know the PF operator for this sequence
This sequence has a smooth toric Fano representative
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(26, 520127, 'smooth', 3)
(176, 430040, 'not terminal', 2)
Maximum Picard rank: 3; minimum Picard rank: 2
================================================================================
Period sequence 164
First 10 period coefficients: [1, 0, 8, 12, 192, 600, 6740, 30240, 286720, 1580880]
I do not know the PF operator for this sequence
This sequence has no conifold representatives
It arises from the following polytopes [(PALP id, grdb id, smoothness, Picard rank)]:
(276, 518711, 'not terminal', 2)
(330, 429041, 'not terminal', 2)
(539, 516907, 'not terminal', 1)
(604, 425463, 'not terminal', 1)
(825, 513259, 'not terminal', 1)
(1159, 539326, 'not terminal', 1)
(1202, 507563, 'not terminal', 1)
(1224, 507307, 'not terminal', 1)
(1279, 413294, 'not terminal', 1)
Maximum Picard rank: 2; minimum Picard rank: 1
================================================================================