Database - modcurve_models (Models for modular curves)

Formats: - HTML - YAML - JSON - 2026-03-15T14:07:09.764777 - next page

Query: /api/modcurve_models/?_offset=0

Column	Type
dont_display	boolean
equation	text[]
modcurve	text
model_type	smallint
number_variables	smallint
smooth	boolean

0. id: 0
   {'dont_display': False, 'equation': ['x^2-x*y+y^2-12*x*z-12*y*z+225*z^2'], 'modcurve': '3.6.0.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
1. id: 1
   {'dont_display': False, 'equation': ['x^2+y^2+16*x*z-16*y*z+144*z^2'], 'modcurve': '4.8.0.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
2. id: 2
   {'dont_display': False, 'equation': ['x^2+y^2+64*z^2'], 'modcurve': '4.12.0.c.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
3. id: 3
   {'dont_display': False, 'equation': ['x^2+y^2+16*z^2'], 'modcurve': '4.24.0.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
4. id: 4
   {'dont_display': False, 'equation': ['8*x^2-10*x*y+5*y^2+3*x*z+5*y*z+7*z^2'], 'modcurve': '5.20.0.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
5. id: 5
   {'dont_display': False, 'equation': ['7*x^2+2*x*y+8*y^2-10*x*z+5*y*z+5*z^2'], 'modcurve': '5.20.0.b.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
6. id: 6
   {'dont_display': False, 'equation': ['3*x^2-2*x*y+2*y^2-3*x*z+y*z+2*z^2'], 'modcurve': '5.60.0.b.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
7. id: 7
   {'dont_display': False, 'equation': ['x^3-y^2*z-27*z^3'], 'modcurve': '6.6.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
8. id: 8
   {'dont_display': False, 'equation': ['x^3-y^2*z+z^3'], 'modcurve': '6.6.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
9. id: 9
   {'dont_display': False, 'equation': ['3*y^2+z^2-18*x*w+z*w+w^2', '36*x^2-y^2+3*x*w'], 'modcurve': '6.12.1.a.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
10. id: 10
    {'dont_display': False, 'equation': ['10*x^4-2*x^3*y+x^2*y^2-11*x^2*z^2+2*x*y*z^2+4*z^4'], 'modcurve': '6.12.1.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
11. id: 11
    {'dont_display': False, 'equation': ['x^3-y^2*z-135*x*z^2-594*z^3'], 'modcurve': '6.12.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
12. id: 12
    {'dont_display': False, 'equation': ['12*x^2+y^2-x*z', '4*x^2-25*y^2+20*x*z+z^2+28*x*w-z*w+w^2'], 'modcurve': '6.12.1.c.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
13. id: 13
    {'dont_display': False, 'equation': ['388*x^4+16*x^3*y+x^2*y^2+19*x^2*z^2-x*y*z^2+z^4'], 'modcurve': '6.12.1.c.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
14. id: 14
    {'dont_display': False, 'equation': ['x^3-y^2*z-15*x*z^2+22*z^3'], 'modcurve': '6.12.1.d.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
15. id: 15
    {'dont_display': False, 'equation': ['x^2-4*x*y+25*y^2+x*z+4*y*z+z^2'], 'modcurve': '6.18.0.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
16. id: 16
    {'dont_display': False, 'equation': ['x^3-y^2*z+z^3'], 'modcurve': '6.18.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
17. id: 17
    {'dont_display': False, 'equation': ['x^3-y^2*z-27*z^3'], 'modcurve': '6.18.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
18. id: 18
    {'dont_display': False, 'equation': ['x^3-y^2*z-27*z^3'], 'modcurve': '6.24.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
19. id: 19
    {'dont_display': False, 'equation': ['x^3-y^2*z+z^3'], 'modcurve': '6.24.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
20. id: 20
    {'dont_display': False, 'equation': ['x^2+3*x*y+x*z+z^2', 'x^2-2*x*y+13*y^2+x*w+2*y*w+w^2'], 'modcurve': '6.36.1.a.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
21. id: 21
    {'dont_display': False, 'equation': ['28*x^4+x^3*y+x^2*y^2+32*x^3*z-2*x^2*y*z+45*x^2*z^2-2*x*y*z^2+26*x*z^3+13*z^4'], 'modcurve': '6.36.1.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
22. id: 22
    {'dont_display': False, 'equation': ['x^3-y^2*z-15*x*z^2+22*z^3'], 'modcurve': '6.36.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
23. id: 23
    {'dont_display': False, 'equation': ['x*z-z*w+w^2', '4*x^2+3*y^2+x*z-3*y*z+z^2'], 'modcurve': '6.36.1.c.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
24. id: 24
    {'dont_display': False, 'equation': ['x^4-3*x^3*y+3*x^2*y^2+x^3*z+3*x^2*z^2-8*x*z^3+4*z^4'], 'modcurve': '6.36.1.c.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
25. id: 25
    {'dont_display': False, 'equation': ['x^3-y^2*z-135*x*z^2-594*z^3'], 'modcurve': '6.36.1.d.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
26. id: 26
    {'dont_display': False, 'equation': ['x^3-y^2*z+z^3'], 'modcurve': '6.72.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
27. id: 27
    {'dont_display': False, 'equation': ['x^3-y^2*z-27*z^3'], 'modcurve': '6.72.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
28. id: 28
    {'dont_display': False, 'equation': ['y^2+x*z-x*w-x*t-w*t+x*u+y*u+w*u+t*u', 'x^2-x*y-x*z+y*z+x*t-y*t+w*t+t^2+x*u+z*u-w*u-t*u+u^2', 'x^2-x*y+y^2+x*z-x*w+y*w+w^2+x*t+y*t+w*t+t^2-w*u', 'x^2-x*y-y*z-x*w+y*w+y*t-z*t-w*t-x*u+w*u-u^2', 'x*y+z*w+w^2+y*t+w*t+y*u-z*u+t*u', 'y^2+2*x*z-z^2-z*w+y*t+z*t+t*u-u^2', 'x*y-y^2+z^2-z*t+x*u-y*u', 'x*z-y*z+z^2+x*w-2*y*w-z*w-y*t+x*u+u^2', 'x*y+x*z+y*z+z^2+y*w+2*z*w+x*u+w*u'], 'modcurve': '7.42.1.a.1', 'model_type': 8, 'number_variables': 6, 'smooth': True}
29. id: 29
    {'dont_display': False, 'equation': ['8*x^6+48*x^5*y+184*x^4*y^2+343*x^3*y^3+427*x^2*y^4+245*x*y^5+49*y^6-4*x^5*z-84*x^4*y*z-365*x^3*y^2*z-839*x^2*y^3*z-805*x*y^4*z-231*y^5*z+22*x^4*z^2+111*x^3*y*z^2+508*x^2*y^2*z^2+921*x*y^3*z^2+418*y^4*z^2-32*x^3*z^3-147*x^2*y*z^3-482*x*y^2*z^3-372*y^3*z^3+40*x^2*z^4+160*x*y*z^4+187*y^2*z^4-44*x*z^5-67*y*z^5+17*z^6'], 'modcurve': '7.42.1.a.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
30. id: 30
    {'dont_display': False, 'equation': ['x^3-x^2*z-x*y*z-y^2*z-1822*x*z^2+30393*z^3'], 'modcurve': '7.42.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
31. id: 31
    {'dont_display': False, 'equation': ['x^3-x^2*z-x*y*z-y^2*z-2*x*z^2-z^3'], 'modcurve': '7.56.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
32. id: 32
    {'dont_display': False, 'equation': ['x^3-x^2*z-x*y*z-y^2*z-107*x*z^2+552*z^3'], 'modcurve': '7.56.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
33. id: 33
    {'dont_display': False, 'equation': ['x^3-x^2*z-x*y*z-y^2*z-107*x*z^2+552*z^3'], 'modcurve': '7.84.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
34. id: 34
    {'dont_display': False, 'equation': ['x^4-2*x^3*y+3*x^2*y^2-2*x*y^3+y^4+2*x^3*z+3*x^2*y*z-3*x*y^2*z-2*y^3*z-3*x^2*z^2+9*x*y*z^2-3*y^2*z^2-4*x*z^3+4*y*z^3-3*z^4'], 'modcurve': '7.168.3.a.1', 'model_type': 0, 'number_variables': 3, 'smooth': True}
35. id: 35
    {'dont_display': False, 'equation': ['x^3*y-y^3*z-x*z^3'], 'modcurve': '7.168.3.b.1', 'model_type': 0, 'number_variables': 3, 'smooth': True}
36. id: 36
    {'dont_display': False, 'equation': ['x^2+144*y^2-32*y*z+2*z^2'], 'modcurve': '8.8.0.b.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
37. id: 37
    {'dont_display': False, 'equation': ['2*x^2+y^2+64*z^2'], 'modcurve': '8.12.0.c.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
38. id: 38
    {'dont_display': False, 'equation': ['x^2+2*y^2+64*z^2'], 'modcurve': '8.12.0.e.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
39. id: 39
    {'dont_display': False, 'equation': ['x^2+64*y^2+z^2'], 'modcurve': '8.12.0.j.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
40. id: 40
    {'dont_display': False, 'equation': ['x^3-y^2*z+x*z^2'], 'modcurve': '8.12.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
41. id: 41
    {'dont_display': False, 'equation': ['x^3-y^2*z+4*x*z^2'], 'modcurve': '8.12.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
42. id: 42
    {'dont_display': False, 'equation': ['x^3-y^2*z-4*x*z^2'], 'modcurve': '8.12.1.c.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
43. id: 43
    {'dont_display': False, 'equation': ['x^3-y^2*z-x*z^2'], 'modcurve': '8.12.1.d.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
44. id: 44
    {'dont_display': False, 'equation': ['x^2+2*y^2+16*z^2'], 'modcurve': '8.24.0.b.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
45. id: 45
    {'dont_display': False, 'equation': ['16*x^2+y^2+z^2'], 'modcurve': '8.24.0.j.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
46. id: 46
    {'dont_display': False, 'equation': ['3*x^2+2*x*y+3*y^2+2*z^2'], 'modcurve': '8.24.0.l.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
47. id: 47
    {'dont_display': False, 'equation': ['x^2+2*y^2+16*z^2'], 'modcurve': '8.24.0.p.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
48. id: 48
    {'dont_display': False, 'equation': ['3*x^2+2*x*y+3*y^2+2*z^2'], 'modcurve': '8.24.0.u.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
49. id: 49
    {'dont_display': False, 'equation': ['x^2+16*y^2+z^2'], 'modcurve': '8.24.0.w.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
50. id: 50
    {'dont_display': False, 'equation': ['x^2+2*y^2+8*z^2'], 'modcurve': '8.24.0.bd.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
51. id: 51
    {'dont_display': False, 'equation': ['8*x^2+y^2+z^2'], 'modcurve': '8.24.0.bg.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
52. id: 52
    {'dont_display': False, 'equation': ['20*x^2+8*x*y+y^2+2*z^2'], 'modcurve': '8.24.0.bk.2', 'model_type': 2, 'number_variables': 3, 'smooth': True}
53. id: 53
    {'dont_display': False, 'equation': ['20*x^2+8*x*y+y^2+z^2'], 'modcurve': '8.24.0.bk.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
54. id: 54
    {'dont_display': False, 'equation': ['x^2+y^2+8*z^2'], 'modcurve': '8.24.0.bm.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
55. id: 55
    {'dont_display': False, 'equation': ['x^2+8*y^2+2*z^2'], 'modcurve': '8.24.0.br.1', 'model_type': 2, 'number_variables': 3, 'smooth': True}
56. id: 56
    {'dont_display': False, 'equation': ['x^3-y^2*z+4*x*z^2'], 'modcurve': '8.24.1.a.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
57. id: 57
    {'dont_display': False, 'equation': ['x^3-y^2*z+x*z^2'], 'modcurve': '8.24.1.b.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
58. id: 58
    {'dont_display': False, 'equation': ['x^3-y^2*z-x*z^2'], 'modcurve': '8.24.1.c.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
59. id: 59
    {'dont_display': False, 'equation': ['x^3-y^2*z-4*x*z^2'], 'modcurve': '8.24.1.d.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
60. id: 60
    {'dont_display': False, 'equation': ['4*y^2+2*z^2+w^2', '4*x^2-y*w'], 'modcurve': '8.24.1.e.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
61. id: 61
    {'dont_display': False, 'equation': ['x^4+2*y^2*z^2+4*z^4'], 'modcurve': '8.24.1.e.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
62. id: 62
    {'dont_display': False, 'equation': ['x^3-y^2*z+x*z^2'], 'modcurve': '8.24.1.f.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
63. id: 63
    {'dont_display': False, 'equation': ['4*y^2+2*z^2+w^2', '8*x^2+y*w'], 'modcurve': '8.24.1.g.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
64. id: 64
    {'dont_display': False, 'equation': ['x^4+2*y^2*z^2+z^4'], 'modcurve': '8.24.1.g.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
65. id: 65
    {'dont_display': False, 'equation': ['4*y^2-2*z^2-w^2', '4*x^2+y*w'], 'modcurve': '8.24.1.h.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
66. id: 66
    {'dont_display': False, 'equation': ['x^4-2*y^2*z^2-4*z^4'], 'modcurve': '8.24.1.h.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
67. id: 67
    {'dont_display': False, 'equation': ['4*y^2+z^2+w^2', '4*x^2+y*z'], 'modcurve': '8.24.1.i.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
68. id: 68
    {'dont_display': False, 'equation': ['4*x^4+y^2*z^2+z^4'], 'modcurve': '8.24.1.i.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
69. id: 69
    {'dont_display': False, 'equation': ['2*x^2-y*z', '4*y^2+z^2+w^2'], 'modcurve': '8.24.1.j.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
70. id: 70
    {'dont_display': False, 'equation': ['x^4+y^2*z^2+z^4'], 'modcurve': '8.24.1.j.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
71. id: 71
    {'dont_display': False, 'equation': ['4*y^2-2*z^2+w^2', '4*x^2+y*w'], 'modcurve': '8.24.1.k.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
72. id: 72
    {'dont_display': False, 'equation': ['x^4-2*y^2*z^2+4*z^4'], 'modcurve': '8.24.1.k.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
73. id: 73
    {'dont_display': False, 'equation': ['x^3-y^2*z-x*z^2'], 'modcurve': '8.24.1.l.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
74. id: 74
    {'dont_display': False, 'equation': ['x^3-y^2*z+4*x*z^2'], 'modcurve': '8.24.1.m.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
75. id: 75
    {'dont_display': False, 'equation': ['x^3-y^2*z+x*z^2'], 'modcurve': '8.24.1.n.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
76. id: 76
    {'dont_display': False, 'equation': ['x^3-y^2*z+x*z^2'], 'modcurve': '8.24.1.o.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
77. id: 77
    {'dont_display': False, 'equation': ['4*y^2+2*z^2-w^2', '4*x^2+y*w'], 'modcurve': '8.24.1.p.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
78. id: 78
    {'dont_display': False, 'equation': ['x^4+2*y^2*z^2-4*z^4'], 'modcurve': '8.24.1.p.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
79. id: 79
    {'dont_display': False, 'equation': ['y*z-2*x*w', '16*x^2+y^2+2*z^2+w^2'], 'modcurve': '8.24.1.q.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
80. id: 80
    {'dont_display': False, 'equation': ['x^2*y^2+2*x^2*z^2+y^2*z^2+4*z^4'], 'modcurve': '8.24.1.q.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
81. id: 81
    {'dont_display': False, 'equation': ['x^3-y^2*z-44*x*z^2-112*z^3'], 'modcurve': '8.24.1.r.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
82. id: 82
    {'dont_display': False, 'equation': ['x^3-y^2*z-44*x*z^2+112*z^3'], 'modcurve': '8.24.1.s.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
83. id: 83
    {'dont_display': False, 'equation': ['x^3-y^2*z-44*x*z^2-112*z^3'], 'modcurve': '8.24.1.t.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
84. id: 84
    {'dont_display': False, 'equation': ['x^3-y^2*z-11*x*z^2-14*z^3'], 'modcurve': '8.24.1.u.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
85. id: 85
    {'dont_display': False, 'equation': ['2*x*z-y*w', '16*x^2+4*y^2+2*z^2+w^2'], 'modcurve': '8.24.1.v.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
86. id: 86
    {'dont_display': False, 'equation': ['2*x^4+x^2*y^2+x^2*z^2+y^2*z^2'], 'modcurve': '8.24.1.v.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
87. id: 87
    {'dont_display': False, 'equation': ['x^3-y^2*z-11*x*z^2-14*z^3'], 'modcurve': '8.24.1.w.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
88. id: 88
    {'dont_display': False, 'equation': ['x^3-y^2*z-11*x*z^2+14*z^3'], 'modcurve': '8.24.1.x.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
89. id: 89
    {'dont_display': False, 'equation': ['x^3-y^2*z-44*x*z^2-112*z^3'], 'modcurve': '8.24.1.y.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
90. id: 90
    {'dont_display': False, 'equation': ['2*x*z+y*w', '32*x^2+8*y^2+2*z^2+w^2'], 'modcurve': '8.24.1.z.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
91. id: 91
    {'dont_display': False, 'equation': ['x^4+x^2*y^2+2*x^2*z^2+4*y^2*z^2'], 'modcurve': '8.24.1.z.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
92. id: 92
    {'dont_display': False, 'equation': ['x^3-y^2*z-44*x*z^2-112*z^3'], 'modcurve': '8.24.1.ba.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
93. id: 93
    {'dont_display': False, 'equation': ['x^3-y^2*z-44*x*z^2+112*z^3'], 'modcurve': '8.24.1.bb.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
94. id: 94
    {'dont_display': False, 'equation': ['y*z+x*w', '8*x^2+4*y^2+z^2+w^2'], 'modcurve': '8.24.1.bc.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}
95. id: 95
    {'dont_display': False, 'equation': ['2*x^2*y^2+x^2*z^2+y^2*z^2+z^4'], 'modcurve': '8.24.1.bc.1', 'model_type': 2, 'number_variables': 3, 'smooth': False}
96. id: 96
    {'dont_display': False, 'equation': ['x^3-y^2*z-11*x*z^2-14*z^3'], 'modcurve': '8.24.1.bd.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
97. id: 97
    {'dont_display': False, 'equation': ['x^3-y^2*z-11*x*z^2+14*z^3'], 'modcurve': '8.24.1.be.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
98. id: 98
    {'dont_display': False, 'equation': ['x^3-y^2*z-11*x*z^2-14*z^3'], 'modcurve': '8.24.1.bf.1', 'model_type': 5, 'number_variables': 3, 'smooth': True}
99. id: 99
    {'dont_display': False, 'equation': ['2*x*y-y^2-2*x*z-2*x*w+z*w', '4*x^2+2*x*y+y^2+2*x*z+z^2+2*x*w-z*w+w^2'], 'modcurve': '8.32.1.a.1', 'model_type': 8, 'number_variables': 4, 'smooth': True}