Database - belyi_specializations (specializations of Belyi maps)

Formats: - HTML - YAML - JSON - 2026-04-20T08:05:29.772870 - next page

Query: /api/belyi_specializations/?_offset=0

Column	Type
algebra	jsonb
label	text
point	text

0. id: 0
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '1'}
1. id: 1
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '9/8'}
2. id: 2
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '3/4'}
3. id: 3
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '1/2'}
4. id: 4
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '3/2'}
5. id: 5
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '1'}
6. id: 6
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '2/3'}
7. id: 7
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '2'}
8. id: 8
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '4/3'}
9. id: 9
   {'algebra': [[0, 1]], 'label': '1T1-1_1_1-a', 'point': '8/9'}
10. id: 10
    {'algebra': [[0, 1], [0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '1'}
11. id: 11
    {'algebra': [[0, 1], [0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '9/8'}
12. id: 12
    {'algebra': [[1, -1, 1]], 'label': '2T1-2_2_1.1-a', 'point': '3/4'}
13. id: 13
    {'algebra': [[1, 0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '1/2'}
14. id: 14
    {'algebra': [[-3, 0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '3/2'}
15. id: 15
    {'algebra': [[0, 1], [0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '1'}
16. id: 16
    {'algebra': [[2, 0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '2/3'}
17. id: 17
    {'algebra': [[-2, 0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '2'}
18. id: 18
    {'algebra': [[0, 1], [0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '4/3'}
19. id: 19
    {'algebra': [[2, 0, 1]], 'label': '2T1-2_2_1.1-a', 'point': '8/9'}
20. id: 20
    {'algebra': [[0, 1], [0, 1], [0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '1'}
21. id: 21
    {'algebra': [[-3, 0, 0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '9/8'}
22. id: 22
    {'algebra': [[-3, 0, 0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '3/4'}
23. id: 23
    {'algebra': [[0, 1], [1, -1, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '1/2'}
24. id: 24
    {'algebra': [[-3, 0, 0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '3/2'}
25. id: 25
    {'algebra': [[0, 1], [0, 1], [0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '1'}
26. id: 26
    {'algebra': [[-2, 0, 0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '2/3'}
27. id: 27
    {'algebra': [[-2, 0, 0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '2'}
28. id: 28
    {'algebra': [[-2, 0, 0, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '4/3'}
29. id: 29
    {'algebra': [[0, 1], [1, -1, 1]], 'label': '3T1-3_3_1.1.1-a', 'point': '8/9'}
30. id: 30
    {'algebra': [[0, 1], [0, 1], [0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '1'}
31. id: 31
    {'algebra': [[-6, -9, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '9/8'}
32. id: 32
    {'algebra': [[-3, 0, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '3/4'}
33. id: 33
    {'algebra': [[-2, 3, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '1/2'}
34. id: 34
    {'algebra': [[-6, -9, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '3/2'}
35. id: 35
    {'algebra': [[0, 1], [0, 1], [0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '1'}
36. id: 36
    {'algebra': [[-4, -3, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '2/3'}
37. id: 37
    {'algebra': [[0, 1], [-3, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '2'}
38. id: 38
    {'algebra': [[-1, -3, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '4/3'}
39. id: 39
    {'algebra': [[-2, 0, 0, 1]], 'label': '3T2-3_2.1_2.1-a', 'point': '8/9'}
40. id: 40
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '1'}
41. id: 41
    {'algebra': [[-3, 0, 1], [1, -1, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '9/8'}
42. id: 42
    {'algebra': [[3, 0, -3, 0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '3/4'}
43. id: 43
    {'algebra': [[1, 0, 0, 0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '1/2'}
44. id: 44
    {'algebra': [[-3, 0, 0, 0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '3/2'}
45. id: 45
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '1'}
46. id: 46
    {'algebra': [[2, 0, 0, 0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '2/3'}
47. id: 47
    {'algebra': [[-2, 0, 0, 0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '2'}
48. id: 48
    {'algebra': [[-2, 0, 1], [2, 0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '4/3'}
49. id: 49
    {'algebra': [[2, 0, 0, 0, 1]], 'label': '4T1-4_4_1.1.1.1-a', 'point': '8/9'}
50. id: 50
    {'algebra': [[1, 0, 1], [1, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '1'}
51. id: 51
    {'algebra': [[2, 0, 1], [2, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '9/8'}
52. id: 52
    {'algebra': [[1, -1, 1], [1, -1, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '3/4'}
53. id: 53
    {'algebra': [[1, 0, 0, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '1/2'}
54. id: 54
    {'algebra': [[1, 0, 4, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '3/2'}
55. id: 55
    {'algebra': [[1, 0, 1], [1, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '1'}
56. id: 56
    {'algebra': [[1, 0, 4, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '2/3'}
57. id: 57
    {'algebra': [[1, 0, 0, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '2'}
58. id: 58
    {'algebra': [[1, -1, 1], [1, -1, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '4/3'}
59. id: 59
    {'algebra': [[2, 0, 1], [2, 0, 1]], 'label': '4T2-2.2_2.2_2.2-a', 'point': '8/9'}
60. id: 60
    {'algebra': [[-2, 0, 1], [-2, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '1'}
61. id: 61
    {'algebra': [[-6, 0, 1], [-3, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '9/8'}
62. id: 62
    {'algebra': [[3, 0, -3, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '3/4'}
63. id: 63
    {'algebra': [[2, 0, -2, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '1/2'}
64. id: 64
    {'algebra': [[6, 0, -6, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '3/2'}
65. id: 65
    {'algebra': [[-2, 0, 1], [-2, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '1'}
66. id: 66
    {'algebra': [[6, 0, -4, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '2/3'}
67. id: 67
    {'algebra': [[2, 0, -4, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '2'}
68. id: 68
    {'algebra': [[0, 1], [0, 1], [-3, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '4/3'}
69. id: 69
    {'algebra': [[2, 0, 0, 0, 1]], 'label': '4T3-4_2.2_2.1.1-a', 'point': '8/9'}
70. id: 70
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '1'}
71. id: 71
    {'algebra': [[6, -4, -6, 0, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '9/8'}
72. id: 72
    {'algebra': [[2, -4, 0, -2, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '3/4'}
73. id: 73
    {'algebra': [[-6, 0, 1], [2, 0, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '1/2'}
74. id: 74
    {'algebra': [[7, -2, -3, -2, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '3/2'}
75. id: 75
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '1'}
76. id: 76
    {'algebra': [[-6, -4, 0, 0, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '2/3'}
77. id: 77
    {'algebra': [[-6, -4, 0, 0, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '2'}
78. id: 78
    {'algebra': [[0, 1], [-2, 0, 0, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '4/3'}
79. id: 79
    {'algebra': [[1, -2, 0, -2, 1]], 'label': '4T4-3.1_3.1_2.2-a', 'point': '8/9'}
80. id: 80
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '1'}
81. id: 81
    {'algebra': [[3, -6, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '9/8'}
82. id: 82
    {'algebra': [[3, -6, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '3/4'}
83. id: 83
    {'algebra': [[1, -2, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '1/2'}
84. id: 84
    {'algebra': [[2, -4, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '3/2'}
85. id: 85
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '1'}
86. id: 86
    {'algebra': [[2, -4, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '2/3'}
87. id: 87
    {'algebra': [[1, -2, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '2'}
88. id: 88
    {'algebra': [[3, -6, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '4/3'}
89. id: 89
    {'algebra': [[3, -6, 0, -2, 1]], 'label': '4T4-3.1_3.1_3.1-a', 'point': '8/9'}
90. id: 90
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '1'}
91. id: 91
    {'algebra': [[0, 1], [-2, 3, 0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '9/8'}
92. id: 92
    {'algebra': [[-1, 2, 3, -2, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '3/4'}
93. id: 93
    {'algebra': [[-3, -4, 0, 0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '1/2'}
94. id: 94
    {'algebra': [[6, -8, -6, 0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '3/2'}
95. id: 95
    {'algebra': [[0, 1], [0, 1], [0, 1], [0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '1'}
96. id: 96
    {'algebra': [[-6, -8, 0, 0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '2/3'}
97. id: 97
    {'algebra': [[6, -8, 0, 0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '2'}
98. id: 98
    {'algebra': [[-1, 2, 3, -2, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '4/3'}
99. id: 99
    {'algebra': [[12, -16, -12, 0, 1]], 'label': '4T5-4_3.1_2.1.1-a', 'point': '8/9'}