Abelian variety isogeny class data - 2.59.a_acw

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• av_fq_isog •

  Column	Type
  abvar_count	numeric
  abvar_counts	numeric[]
  abvar_counts_str	text
  all_polarized_product	boolean
  all_unpolarized_product	boolean
  angle_corank	smallint
  angle_rank	smallint
  angles	double precision[]
  center_dim	smallint
  cohen_macaulay_max	smallint
  curve_count	integer
  curve_counts	numeric[]
  curve_counts_str	text
  curves	text[]
  dim1_distinct	smallint
  dim1_factors	smallint
  dim2_distinct	smallint
  dim2_factors	smallint
  dim3_distinct	smallint
  dim3_factors	smallint
  dim4_distinct	smallint
  dim4_factors	smallint
  dim5_distinct	smallint
  dim5_factors	smallint
  endomorphism_ring_count	smallint
  g	smallint
  galois_groups	text[]
  geom_dim1_distinct	smallint
  geom_dim1_factors	smallint
  geom_dim2_distinct	smallint
  geom_dim2_factors	smallint
  geom_dim3_distinct	smallint
  geom_dim3_factors	smallint
  geom_dim4_distinct	smallint
  geom_dim4_factors	smallint
  geom_dim5_distinct	smallint
  geom_dim5_factors	smallint
  geometric_center_dim	smallint
  geometric_extension_degree	smallint
  geometric_galois_groups	text[]
  geometric_number_fields	text[]
  geometric_splitting_field	text
  geometric_splitting_polynomials	numeric[]
  group_structure_count	smallint
  has_geom_ss_factor	boolean
  has_jacobian	smallint
  has_principal_polarization	smallint
  hyp_count	integer
  is_geometrically_simple	boolean
  is_geometrically_squarefree	boolean
  is_primitive	boolean
  is_simple	boolean
  is_squarefree	boolean
  is_supersingular	boolean
  jacobian_count	integer
  label	text
  max_divalg_dim	smallint
  max_geom_divalg_dim	smallint
  max_twist_degree	integer
  newton_coelevation	smallint
  newton_elevation	smallint
  number_fields	text[]
  p	smallint
  p_rank	smallint
  p_rank_deficit	smallint
  pic_prime_gens	integer[]
  poly	integer[]
  poly_str	text
  primitive_models	text[]
  principal_polarization_count	integer
  q	integer
  real_poly	integer[]
  simple_distinct	text[]
  simple_factors	text[]
  simple_multiplicities	smallint[]
  singular_primes	text[]
  size	integer
  slopes	text[]
  splitting_field	text
  splitting_polynomials	numeric[]
  twist_count	integer
  twists	jsonb
  weak_equivalence_count	smallint
  zfv_index	numeric
  zfv_index_factorization	numeric[]
  zfv_is_bass	boolean
  zfv_is_maximal	boolean
  zfv_pic_size	integer
  zfv_plus_index	numeric
  zfv_plus_index_factorization	numeric[]
  zfv_plus_norm	numeric
  zfv_singular_count	smallint
  zfv_singular_primes	text[]

  
  {'abvar_count': 3408, 'abvar_counts': [3408, 11614464, 42180901200, 146866476847104, 511116753651134928, 1779228426044161440000, 6193386212886838721108688, 21559183875406084196433199104, 75047496554032959905816768542800, 261240335862874949752474262461565184], 'abvar_counts_str': '3408 11614464 42180901200 146866476847104 511116753651134928 1779228426044161440000 6193386212886838721108688 21559183875406084196433199104 75047496554032959905816768542800 261240335862874949752474262461565184 ', 'angle_corank': 1, 'angle_rank': 1, 'angles': [0.142117056105512, 0.857882943894489], 'center_dim': 4, 'cohen_macaulay_max': 3, 'curve_count': 60, 'curve_counts': [60, 3334, 205380, 12120334, 714924300, 42181268758, 2488651484820, 146830481657374, 8662995818654940, 511116754001628454], 'curve_counts_str': '60 3334 205380 12120334 714924300 42181268758 2488651484820 146830481657374 8662995818654940 511116754001628454 ', 'curves': ['y^2=31*x^6+3*x^5+41*x^4+4*x^3+55*x+54', 'y^2=3*x^6+6*x^5+23*x^4+8*x^3+51*x+49', 'y^2=30*x^6+x^5+19*x^4+22*x^3+6*x^2+32*x', 'y^2=19*x^6+11*x^5+27*x^4+30*x^3+49*x^2+41*x+7', 'y^2=17*x^6+52*x^5+27*x^4+21*x^3+26*x^2+21*x+16', 'y^2=34*x^6+45*x^5+54*x^4+42*x^3+52*x^2+42*x+32', 'y^2=41*x^6+14*x^5+9*x^4+26*x^3+58*x^2+6*x+43', 'y^2=x^6+x^3+54', 'y^2=56*x^6+43*x^5+23*x^4+2*x^3+12*x^2+25*x+52', 'y^2=53*x^6+27*x^5+46*x^4+4*x^3+24*x^2+50*x+45', 'y^2=47*x^6+10*x^5+4*x^4+36*x^3+43*x^2+38*x+41', 'y^2=35*x^6+20*x^5+8*x^4+13*x^3+27*x^2+17*x+23', 'y^2=29*x^6+21*x^5+41*x^4+18*x^3+8*x^2+26*x+24', 'y^2=20*x^6+18*x^5+47*x^4+2*x^3+9*x^2+7*x+43', 'y^2=44*x^6+50*x^5+30*x^4+49*x^3+51*x^2+56*x+21', 'y^2=40*x^6+2*x^5+19*x^4+38*x^2+51*x+23', 'y^2=21*x^6+4*x^5+38*x^4+17*x^2+43*x+46', 'y^2=53*x^6+33*x^5+34*x^4+2*x^3+8*x^2+18*x+44', 'y^2=47*x^6+7*x^5+9*x^4+4*x^3+16*x^2+36*x+29', 'y^2=52*x^6+38*x^5+13*x^4+44*x^3+35*x^2+51*x+38', 'y^2=45*x^6+17*x^5+26*x^4+29*x^3+11*x^2+43*x+17', 'y^2=44*x^6+23*x^5+45*x^4+46*x^3+37*x^2+41*x+5', 'y^2=29*x^6+46*x^5+31*x^4+33*x^3+15*x^2+23*x+10', 'y^2=33*x^6+28*x^5+7*x^4+37*x^3+5*x^2+42*x+25', 'y^2=7*x^6+56*x^5+14*x^4+15*x^3+10*x^2+25*x+50', 'y^2=57*x^6+36*x^5+42*x^4+47*x^3+5*x^2+21*x+2', 'y^2=55*x^6+13*x^5+25*x^4+35*x^3+10*x^2+42*x+4', 'y^2=27*x^6+21*x^5+x^4+35*x^3+38*x^2+58*x+55', 'y^2=54*x^6+39*x^5+56*x^4+4*x^3+10*x^2+20*x+1', 'y^2=49*x^6+19*x^5+53*x^4+8*x^3+20*x^2+40*x+2', 'y^2=11*x^6+2*x^5+45*x^4+20*x^3+2*x^2+14*x+1', 'y^2=51*x^6+40*x^5+22*x^4+15*x^3+6*x^2+10*x+56', 'y^2=28*x^6+22*x^5+42*x^4+19*x^3+4*x^2+30*x+57', 'y^2=48*x^5+31*x^4+45*x^3+24*x^2+36*x+9', 'y^2=37*x^5+3*x^4+31*x^3+48*x^2+13*x+18', 'y^2=56*x^6+54*x^5+58*x^4+21*x^3+19*x^2+14*x+44', 'y^2=53*x^6+49*x^5+57*x^4+42*x^3+38*x^2+28*x+29', 'y^2=42*x^6+56*x^5+43*x^4+37*x^3+14*x^2+27*x+17', 'y^2=4*x^6+17*x^5+21*x^4+53*x^2+33*x+53', 'y^2=8*x^6+34*x^5+42*x^4+47*x^2+7*x+47', 'y^2=48*x^6+54*x^5+36*x^4+12*x^3+34*x^2+58*x+13', 'y^2=48*x^6+58*x^5+28*x^4+44*x^3+37*x^2+39*x+14', 'y^2=37*x^6+57*x^5+56*x^4+29*x^3+15*x^2+19*x+28', 'y^2=6*x^6+43*x^5+19*x^4+53*x^3+25*x^2+37*x+40', 'y^2=46*x^6+39*x^5+26*x^4+9*x^3+50*x^2+43*x+13', 'y^2=33*x^6+19*x^5+52*x^4+18*x^3+41*x^2+27*x+26', 'y^2=46*x^6+56*x^5+3*x^4+18*x^3+34*x^2+21*x+18', 'y^2=44*x^6+11*x^5+36*x^4+40*x^3+37*x^2+27*x+4', 'y^2=29*x^6+22*x^5+13*x^4+21*x^3+15*x^2+54*x+8', 'y^2=x^6+17*x^5+45*x^4+10*x^3+15*x^2+44*x+8', 'y^2=2*x^6+34*x^5+31*x^4+20*x^3+30*x^2+29*x+16', 'y^2=2*x^6+32*x^5+45*x^4+37*x^3+48*x^2+16*x+47', 'y^2=42*x^5+26*x^4+26*x^3+30*x^2+43*x', 'y^2=46*x^6+16*x^5+50*x^4+43*x^3+36*x^2+22*x+26', 'y^2=33*x^6+32*x^5+41*x^4+27*x^3+13*x^2+44*x+52', 'y^2=47*x^6+36*x^5+18*x^4+35*x^3+15*x^2+25*x+16', 'y^2=20*x^6+25*x^5+25*x^4+17*x^3+8*x^2+4*x+22', 'y^2=4*x^6+7*x^5+47*x^4+21*x^3+22*x^2+31*x+2', 'y^2=8*x^6+14*x^5+35*x^4+42*x^3+44*x^2+3*x+4', 'y^2=15*x^6+10*x^5+14*x^4+58*x^3+29*x^2+11*x+11', 'y^2=14*x^6+31*x^5+26*x^4+40*x^3+50*x^2+54*x+36', 'y^2=28*x^6+3*x^5+52*x^4+21*x^3+41*x^2+49*x+13', 'y^2=29*x^6+40*x^5+19*x^4+48*x^3+40*x^2+36*x+52', 'y^2=58*x^6+21*x^5+38*x^4+37*x^3+21*x^2+13*x+45', 'y^2=33*x^6+15*x^5+48*x^4+30*x^3+58*x^2+32*x+45', 'y^2=7*x^6+30*x^5+37*x^4+x^3+57*x^2+5*x+31', 'y^2=4*x^6+35*x^5+10*x^4+41*x^3+40*x^2+17*x+32', 'y^2=8*x^6+11*x^5+20*x^4+23*x^3+21*x^2+34*x+5', 'y^2=11*x^6+29*x^5+26*x^4+5*x^3+34*x^2+19*x+6', 'y^2=22*x^6+58*x^5+52*x^4+10*x^3+9*x^2+38*x+12', 'y^2=24*x^6+35*x^5+22*x^4+3*x^3+56*x^2+13*x+8', 'y^2=48*x^6+11*x^5+44*x^4+6*x^3+53*x^2+26*x+16', 'y^2=9*x^6+23*x^5+50*x^4+18*x^3+x^2+29*x+32', 'y^2=18*x^6+46*x^5+41*x^4+36*x^3+2*x^2+58*x+5', 'y^2=40*x^6+23*x^5+25*x^4+3*x^3+31*x^2+x+36', 'y^2=21*x^6+46*x^5+50*x^4+6*x^3+3*x^2+2*x+13', 'y^2=35*x^6+22*x^5+38*x^4+29*x^3+10*x^2+51*x+32', 'y^2=11*x^6+44*x^5+17*x^4+58*x^3+20*x^2+43*x+5', 'y^2=17*x^6+9*x^5+34*x^4+3*x^3+16*x^2+55*x+24', 'y^2=34*x^6+18*x^5+9*x^4+6*x^3+32*x^2+51*x+48', 'y^2=48*x^6+17*x^5+2*x^4+44*x^3+32*x^2+50*x+26', 'y^2=37*x^6+34*x^5+4*x^4+29*x^3+5*x^2+41*x+52', 'y^2=19*x^6+39*x^5+45*x^4+50*x^3+44*x^2+33*x+26', 'y^2=38*x^6+19*x^5+31*x^4+41*x^3+29*x^2+7*x+52', 'y^2=34*x^6+54*x^5+33*x^4+12*x^3+55*x^2+18*x+31', 'y^2=9*x^6+49*x^5+7*x^4+24*x^3+51*x^2+36*x+3', 'y^2=31*x^6+34*x^5+52*x^4+23*x^3+17*x^2+44*x+29', 'y^2=10*x^6+41*x^5+49*x^4+2*x^3+47*x^2+26*x+22', 'y^2=5*x^6+51*x^5+54*x^4+29*x^3+55*x^2+27*x+30', 'y^2=10*x^6+43*x^5+49*x^4+58*x^3+51*x^2+54*x+1', 'y^2=35*x^6+6*x^5+29*x^4+50*x^3+22*x^2+43*x+51', 'y^2=45*x^6+32*x^5+46*x^4+28*x^3+50*x^2+50*x+13', 'y^2=31*x^6+5*x^5+33*x^4+56*x^3+41*x^2+41*x+26', 'y^2=41*x^6+7*x^5+32*x^4+19*x^3+35*x^2+15*x+50', 'y^2=21*x^6+41*x^5+36*x^4+57*x^3+14*x^2+7*x+29', 'y^2=19*x^6+2*x^5+4*x^4+18*x^3+14*x^2+31*x+27', 'y^2=38*x^6+4*x^5+8*x^4+36*x^3+28*x^2+3*x+54', 'y^2=21*x^6+40*x^5+43*x^4+26*x^3+22*x^2+35*x+53', 'y^2=57*x^6+26*x^5+27*x^4+30*x^3+39*x^2+24*x+9', 'y^2=55*x^6+52*x^5+54*x^4+x^3+19*x^2+48*x+18', 'y^2=7*x^6+49*x^5+55*x^4+49*x^3+6*x^2+18*x+50', 'y^2=14*x^6+39*x^5+51*x^4+39*x^3+12*x^2+36*x+41', 'y^2=52*x^6+20*x^5+45*x^4+33*x^3+58*x^2+45*x+26', 'y^2=45*x^6+40*x^5+31*x^4+7*x^3+57*x^2+31*x+52', 'y^2=55*x^6+28*x^5+33*x^4+29*x^3+6*x^2+49*x+45', 'y^2=46*x^6+26*x^5+6*x^4+9*x^3+52*x^2+19*x+57', 'y^2=33*x^6+52*x^5+12*x^4+18*x^3+45*x^2+38*x+55', 'y^2=20*x^6+58*x^5+2*x^4+4*x^3+41*x^2+34*x+41', 'y^2=23*x^6+10*x^5+50*x^4+35*x^3+12*x^2+44*x+46', 'y^2=2*x^6+21*x^5+50*x^4+27*x^3+41*x^2+25*x+16', 'y^2=46*x^6+25*x^5+46*x^4+41*x^3+26*x^2+20*x+37', 'y^2=33*x^6+50*x^5+33*x^4+23*x^3+52*x^2+40*x+15', 'y^2=47*x^6+29*x^5+4*x^4+9*x^3+47*x^2+25*x+29', 'y^2=39*x^6+41*x^5+54*x^4+7*x^3+53*x^2+26*x+15', 'y^2=38*x^6+44*x^5+53*x^4+6*x^3+36*x^2+52*x+24', 'y^2=17*x^6+29*x^5+47*x^4+12*x^3+13*x^2+45*x+48', 'y^2=7*x^6+41*x^5+58*x^4+47*x^3+38*x^2+51*x+55', 'y^2=14*x^6+23*x^5+57*x^4+35*x^3+17*x^2+43*x+51', 'y^2=47*x^6+5*x^5+29*x^4+47*x^3+13*x^2+49*x+53', 'y^2=35*x^6+10*x^5+58*x^4+35*x^3+26*x^2+39*x+47', 'y^2=41*x^6+52*x^5+8*x^4+46*x^3+48*x^2+58*x+25', 'y^2=30*x^6+40*x^5+7*x^4+26*x^3+55*x^2+2*x+20', 'y^2=x^6+21*x^5+14*x^4+52*x^3+51*x^2+4*x+40', 'y^2=17*x^6+x^5+9*x^4+32*x^3+36*x^2+36*x+15', 'y^2=34*x^6+2*x^5+18*x^4+5*x^3+13*x^2+13*x+30', 'y^2=40*x^6+6*x^5+41*x^4+7*x^3+8*x^2+9*x', 'y^2=30*x^6+6*x^5+44*x^4+20*x^3+8*x^2+30*x+39', 'y^2=34*x^6+29*x^5+50*x^4+13*x^3+51*x^2+51*x+52', 'y^2=9*x^6+58*x^5+41*x^4+26*x^3+43*x^2+43*x+45', 'y^2=35*x^6+55*x^4+20*x^3+4*x^2+42*x+32', 'y^2=11*x^6+51*x^4+40*x^3+8*x^2+25*x+5', 'y^2=33*x^6+2*x^5+25*x^4+23*x^3+14*x^2+23*x+19', 'y^2=29*x^6+13*x^5+23*x^4+26*x^3+39*x^2+16*x+35', 'y^2=50*x^6+46*x^5+29*x^4+16*x^3+6*x^2+23*x+58', 'y^2=41*x^6+33*x^5+58*x^4+32*x^3+12*x^2+46*x+57', 'y^2=47*x^6+28*x^5+29*x^4+56*x^3+18*x^2+18*x+24', 'y^2=35*x^6+56*x^5+58*x^4+53*x^3+36*x^2+36*x+48', 'y^2=29*x^6+41*x^5+12*x^4+56*x^3+6*x^2+7*x+30', 'y^2=7*x^6+44*x^5+45*x^4+33*x^3+36*x^2+36*x+12', 'y^2=14*x^6+29*x^5+31*x^4+7*x^3+13*x^2+13*x+24', 'y^2=22*x^6+25*x^5+29*x^4+30*x^3+45*x^2+52*x+19', 'y^2=40*x^6+16*x^5+24*x^4+49*x^3+11*x^2+6*x+35', 'y^2=21*x^6+32*x^5+48*x^4+39*x^3+22*x^2+12*x+11', 'y^2=9*x^6+25*x^5+23*x^4+37*x^3+36*x^2+21*x+42', 'y^2=18*x^6+50*x^5+46*x^4+15*x^3+13*x^2+42*x+25', 'y^2=41*x^6+51*x^5+23*x^4+30*x^3+12*x^2+2*x+21', 'y^2=23*x^6+43*x^5+46*x^4+x^3+24*x^2+4*x+42', 'y^2=46*x^6+9*x^5+48*x^4+53*x^3+57*x^2+56', 'y^2=33*x^6+18*x^5+37*x^4+47*x^3+55*x^2+53', 'y^2=x^6+x^3+52', 'y^2=41*x^6+39*x^5+54*x^4+53*x^3+21*x^2+13*x+37', 'y^2=43*x^6+15*x^5+4*x^4+53*x^3+2*x^2+48*x+57', 'y^2=5*x^6+50*x^5+35*x^4+43*x^3+54*x^2+54*x+38', 'y^2=33*x^6+7*x^5+55*x^4+14*x^3+5*x^2+55*x+40', 'y^2=7*x^6+14*x^5+51*x^4+28*x^3+10*x^2+51*x+21', 'y^2=3*x^6+6*x^5+57*x^4+36*x^3+4*x^2+49*x+50', 'y^2=6*x^6+12*x^5+55*x^4+13*x^3+8*x^2+39*x+41', 'y^2=33*x^6+x^5+13*x^4+24*x^3+23*x^2+43*x+11', 'y^2=7*x^6+2*x^5+26*x^4+48*x^3+46*x^2+27*x+22', 'y^2=19*x^6+6*x^5+12*x^4+19*x^3+36*x^2+4*x+14', 'y^2=56*x^5+9*x^4+57*x^3+10*x^2+24*x+3', 'y^2=8*x^6+50*x^5+14*x^4+30*x^3+31*x^2+20*x+18', 'y^2=16*x^6+41*x^5+28*x^4+x^3+3*x^2+40*x+36', 'y^2=55*x^6+58*x^5+7*x^4+2*x^3+24*x^2+6*x+29', 'y^2=51*x^6+57*x^5+14*x^4+4*x^3+48*x^2+12*x+58', 'y^2=41*x^6+45*x^5+40*x^3+58*x^2+10*x', 'y^2=23*x^6+31*x^5+21*x^3+57*x^2+20*x', 'y^2=38*x^6+9*x^5+11*x^4+35*x^3+9*x^2+7*x+51', 'y^2=5*x^6+26*x^5+51*x^4+34*x^3+33*x^2+37*x+19', 'y^2=10*x^6+52*x^5+43*x^4+9*x^3+7*x^2+15*x+38', 'y^2=22*x^6+36*x^5+25*x^4+36*x^3+52*x^2+38*x+23', 'y^2=44*x^6+13*x^5+50*x^4+13*x^3+45*x^2+17*x+46', 'y^2=48*x^6+27*x^5+37*x^4+5*x^3+4*x^2+43*x+7', 'y^2=37*x^6+54*x^5+15*x^4+10*x^3+8*x^2+27*x+14', 'y^2=48*x^6+19*x^5+26*x^4+17*x^3+9*x^2+10*x+50', 'y^2=55*x^6+53*x^5+11*x^4+37*x^3+29*x+29', 'y^2=51*x^6+47*x^5+22*x^4+15*x^3+58*x+58', 'y^2=22*x^6+30*x^5+17*x^4+5*x^3+10*x^2+16*x+32', 'y^2=44*x^6+x^5+34*x^4+10*x^3+20*x^2+32*x+5', 'y^2=49*x^6+17*x^5+55*x^4+27*x^3+35*x^2+56*x+33', 'y^2=3*x^6+21*x^5+3*x^4+57*x^3+32*x^2+38*x+49', 'y^2=6*x^6+42*x^5+6*x^4+55*x^3+5*x^2+17*x+39', 'y^2=57*x^6+27*x^5+51*x^4+58*x^3+33*x^2+36*x+42', 'y^2=19*x^6+47*x^5+38*x^4+36*x^3+27*x^2+40*x+25', 'y^2=38*x^6+35*x^5+17*x^4+13*x^3+54*x^2+21*x+50', 'y^2=15*x^6+30*x^5+25*x^4+35*x^3+56*x^2+19*x+24', 'y^2=30*x^6+x^5+50*x^4+11*x^3+53*x^2+38*x+48', 'y^2=4*x^6+56*x^5+50*x^4+23*x^3+17*x^2+27*x+50', 'y^2=8*x^6+53*x^5+41*x^4+46*x^3+34*x^2+54*x+41', 'y^2=54*x^6+51*x^5+43*x^4+x^3+31*x^2+11*x+55', 'y^2=12*x^6+38*x^5+3*x^4+45*x^3+55*x^2+20*x+35', 'y^2=24*x^6+17*x^5+6*x^4+31*x^3+51*x^2+40*x+11', 'y^2=42*x^6+53*x^5+25*x^4+28*x^3+12*x^2+52*x+28', 'y^2=42*x^6+4*x^5+41*x^4+52*x^3+37*x^2+22*x+7', 'y^2=41*x^6+58*x^5+23*x^4+44*x^3+19*x^2+54*x+7', 'y^2=53*x^6+35*x^5+41*x^4+38*x^3+10*x^2+21*x+2', 'y^2=45*x^6+8*x^5+16*x^4+43*x^3+32*x^2+32*x+6', 'y^2=38*x^6+3*x^5+58*x^4+19*x^3+54*x^2+45*x+16', 'y^2=34*x^6+2*x^5+31*x^4+31*x^3+40*x^2+2*x+19', 'y^2=9*x^6+4*x^5+3*x^4+3*x^3+21*x^2+4*x+38', 'y^2=49*x^6+32*x^5+25*x^4+19*x^3+53*x^2+38*x+22', 'y^2=39*x^6+5*x^5+50*x^4+38*x^3+47*x^2+17*x+44', 'y^2=48*x^6+57*x^5+57*x^4+55*x^3+30*x^2+58*x+15', 'y^2=37*x^6+55*x^5+55*x^4+51*x^3+x^2+57*x+30', 'y^2=8*x^6+6*x^5+5*x^4+7*x^2+33*x+10', 'y^2=16*x^6+12*x^5+10*x^4+14*x^2+7*x+20'], 'dim1_distinct': 0, 'dim1_factors': 0, 'dim2_distinct': 1, 'dim2_factors': 1, 'dim3_distinct': 0, 'dim3_factors': 0, 'dim4_distinct': 0, 'dim4_factors': 0, 'dim5_distinct': 0, 'dim5_factors': 0, 'endomorphism_ring_count': 17, 'g': 2, 'galois_groups': ['4T2'], 'geom_dim1_distinct': 1, 'geom_dim1_factors': 2, 'geom_dim2_distinct': 0, 'geom_dim2_factors': 0, 'geom_dim3_distinct': 0, 'geom_dim3_factors': 0, 'geom_dim4_distinct': 0, 'geom_dim4_factors': 0, 'geom_dim5_distinct': 0, 'geom_dim5_factors': 0, 'geometric_center_dim': 2, 'geometric_extension_degree': 2, 'geometric_galois_groups': ['2T1'], 'geometric_number_fields': ['2.0.132.1'], 'geometric_splitting_field': '2.0.132.1', 'geometric_splitting_polynomials': [[33, 0, 1]], 'group_structure_count': 5, 'has_geom_ss_factor': False, 'has_jacobian': 1, 'has_principal_polarization': 1, 'hyp_count': 206, 'is_geometrically_simple': False, 'is_geometrically_squarefree': False, 'is_primitive': True, 'is_simple': True, 'is_squarefree': True, 'is_supersingular': False, 'jacobian_count': 206, 'label': '2.59.a_acw', 'max_divalg_dim': 1, 'max_geom_divalg_dim': 1, 'max_twist_degree': 12, 'newton_coelevation': 2, 'newton_elevation': 0, 'number_fields': ['4.0.17424.2'], 'p': 59, 'p_rank': 2, 'p_rank_deficit': 0, 'poly': [1, 0, -74, 0, 3481], 'poly_str': '1 0 -74 0 3481 ', 'primitive_models': [], 'q': 59, 'real_poly': [1, 0, -192], 'simple_distinct': ['2.59.a_acw'], 'simple_factors': ['2.59.a_acwA'], 'simple_multiplicities': [1], 'singular_primes': ['2,F^2-V+4'], 'slopes': ['0A', '0B', '1A', '1B'], 'splitting_field': '4.0.17424.2', 'splitting_polynomials': [[33, 0, 1, -2, 1]], 'twist_count': 4, 'twists': [['2.59.a_cw', '2.12117361.eki_cfwmti', 4], ['2.59.ay_jr', '2.1779197418239532716881.amqmszxxk_drbsugrasqpwkdgo', 12], ['2.59.y_jr', '2.1779197418239532716881.amqmszxxk_drbsugrasqpwkdgo', 12]], 'weak_equivalence_count': 22, 'zfv_index': 256, 'zfv_index_factorization': [[2, 8]], 'zfv_is_bass': False, 'zfv_is_maximal': False, 'zfv_plus_index': 8, 'zfv_plus_index_factorization': [[2, 3]], 'zfv_plus_norm': 1936, 'zfv_singular_count': 2, 'zfv_singular_primes': ['2,F^2-V+4']}
• av_fq_endalg_factors •

  Column	Type
  base_label	text
  extension_degree	smallint
  extension_label	text
  multiplicity	smallint

  
  
  • id: 49537
    {'base_label': '2.59.a_acw', 'extension_degree': 1, 'extension_label': '2.59.a_acw', 'multiplicity': 1}
  • id: 49538
    {'base_label': '2.59.a_acw', 'extension_degree': 2, 'extension_label': '1.3481.acw', 'multiplicity': 2}
• av_fq_endalg_data •

  Column	Type
  brauer_invariants	text[]
  center	text
  center_dim	smallint
  divalg_dim	smallint
  extension_label	text
  galois_group	text
  places	text[]

  
  {'brauer_invariants': ['0', '0', '0', '0'], 'center': '4.0.17424.2', 'center_dim': 4, 'divalg_dim': 1, 'extension_label': '2.59.a_acw', 'galois_group': '4T2', 'places': [['2', '42', '10', '1'], ['44', '42', '10', '1'], ['4', '42', '10', '1'], ['21', '42', '10', '1']]}
• av_fq_endalg_data •

  Column	Type
  brauer_invariants	text[]
  center	text
  center_dim	smallint
  divalg_dim	smallint
  extension_label	text
  galois_group	text
  places	text[]

  
  {'brauer_invariants': ['0', '0'], 'center': '2.0.132.1', 'center_dim': 2, 'divalg_dim': 1, 'extension_label': '1.3481.acw', 'galois_group': '2T1', 'places': [['47', '1'], ['12', '1']]}