Database - gps_groups ((description not yet updated on this server))

Formats: - HTML - YAML - JSON - 2025-11-16T02:59:36.481297

Query: /api/gps_groups/?_offset=0

Column	Type
Agroup	boolean
Zgroup	boolean
abelian	boolean
abelian_quotient	text
all_subgroups_known	boolean
almost_simple	boolean
aut_abelian	boolean
aut_cyclic	boolean
aut_derived_length	smallint
aut_exponent	numeric
aut_gen_orders	numeric[]
aut_gens	numeric[]
aut_group	text
aut_hash	bigint
aut_nilpotency_class	smallint
aut_nilpotent	boolean
aut_order	numeric
aut_permdeg	integer
aut_perms	numeric[]
aut_phi_ratio	double precision
aut_solvable	boolean
aut_stats	numeric[]
aut_supersolvable	boolean
aut_tex	text
autcent_abelian	boolean
autcent_cyclic	boolean
autcent_exponent	numeric
autcent_group	text
autcent_hash	bigint
autcent_nilpotent	boolean
autcent_order	numeric
autcent_solvable	boolean
autcent_split	boolean
autcent_supersolvable	boolean
autcent_tex	text
autcentquo_abelian	boolean
autcentquo_cyclic	boolean
autcentquo_exponent	numeric
autcentquo_group	text
autcentquo_hash	bigint
autcentquo_nilpotent	boolean
autcentquo_order	numeric
autcentquo_solvable	boolean
autcentquo_supersolvable	boolean
autcentquo_tex	text
cc_stats	numeric[]
center_label	text
center_order	numeric
central_product	boolean
central_quotient	text
commutator_count	integer
commutator_label	text
complements_known	boolean
complete	boolean
complex_characters_known	boolean
composition_factors	text[]
composition_length	smallint
conjugacy_classes_known	boolean
counter	integer
cyclic	boolean
derived_length	smallint
dihedral	boolean
direct_factorization	jsonb
direct_product	boolean
div_stats	numeric[]
element_repr_type	text
elementary	integer
eulerian_function	numeric
exponent	numeric
exponents_of_order	smallint[]
factors_of_aut_order	integer[]
factors_of_order	smallint[]
faithful_reps	numeric[]
familial	boolean
frattini_label	text
frattini_quotient	text
hash	bigint
hyperelementary	integer
inner_abelian	boolean
inner_cyclic	boolean
inner_exponent	numeric
inner_gen_orders	numeric[]
inner_gens	numeric[]
inner_hash	bigint
inner_nilpotent	boolean
inner_order	numeric
inner_split	boolean
inner_tex	text
inner_used	smallint[]
irrC_degree	integer
irrQ_degree	integer
irrQ_dim	integer
irrR_degree	integer
irrep_stats	numeric[]
label	text
linC_count	numeric
linC_degree	integer
linFp_degree	integer
linFq_degree	integer
linQ_degree	integer
linQ_degree_count	numeric
linQ_dim	integer
linQ_dim_count	numeric
linR_count	numeric
linR_degree	integer
maximal_subgroups_known	boolean
metabelian	boolean
metacyclic	boolean
monomial	boolean
name	text
ngens	smallint
nilpotency_class	smallint
nilpotent	boolean
normal_counts	integer[]
normal_index_bound	numeric
normal_order_bound	numeric
normal_subgroups_known	boolean
number_autjugacy_classes	integer
number_characteristic_subgroups	integer
number_conjugacy_classes	integer
number_divisions	integer
number_normal_subgroups	integer
number_subgroup_autclasses	integer
number_subgroup_classes	integer
number_subgroups	numeric
old_label	text
order	numeric
order_factorization_type	integer
order_stats	numeric[]
outer_abelian	boolean
outer_cyclic	boolean
outer_equivalence	boolean
outer_exponent	numeric
outer_gen_orders	numeric[]
outer_gen_pows	numeric[]
outer_gens	numeric[]
outer_group	text
outer_hash	bigint
outer_nilpotent	boolean
outer_order	numeric
outer_permdeg	integer
outer_perms	numeric[]
outer_solvable	boolean
outer_supersolvable	boolean
outer_tex	text
pc_rank	smallint
perfect	boolean
permutation_degree	integer
pgroup	smallint
primary_abelian_invariants	integer[]
quasisimple	boolean
rank	smallint
rational	boolean
rational_characters_known	boolean
ratrep_stats	numeric[]
representations	jsonb
schur_multiplier	integer[]
semidirect_product	boolean
simple	boolean
smith_abelian_invariants	integer[]
solvability_type	smallint
solvable	boolean
subgroup_inclusions_known	boolean
subgroup_index_bound	numeric
supersolvable	boolean
sylow_subgroups_known	boolean
tex_name	text
transitive_degree	integer
wreath_data	text[]
wreath_product	boolean

{'Agroup': False, 'Zgroup': False, 'abelian': False, 'abelian_quotient': '80.45', 'all_subgroups_known': True, 'almost_simple': False, 'aut_abelian': False, 'aut_cyclic': False, 'aut_derived_length': 2, 'aut_exponent': 40, 'aut_gen_orders': [4, 4, 4, 4, 4, 4, 4, 4], 'aut_gens': [[1, 2, 40], [801, 983, 701], [1, 834, 281], [21, 1474, 380], [21, 674, 761], [21, 1127, 921], [801, 807, 60], [1, 1378, 1321], [21, 1438, 300]], 'aut_group': None, 'aut_hash': 4092473743304720055, 'aut_nilpotency_class': -1, 'aut_nilpotent': False, 'aut_order': 163840, 'aut_permdeg': 164, 'aut_perms': [143456295721754787806609783969549019433765034601341562058549711968204847855925379193813182645689524309019623441194528850598453943703253604519131196327640369511259572724074604868782896576820038591544369994145289333424034308348201528597353131435717157900349081105008990359607608859844381623599371, 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112097725710223833674066043870695589074894370169628683952989557660091121453227188102037250962972726839069619816369443293757301069785109911069338174135793579320308645772224847324834841418707368802053713700761610144552216818151726393370346877354564380795319804629875255908359399011239908840367965], 'aut_phi_ratio': 256.0, 'aut_solvable': True, 'aut_stats': [[1, 1, 1, 1], [2, 1, 1, 3], [2, 1, 4, 1], [4, 2, 1, 2], [4, 2, 2, 1], [4, 20, 8, 1], [5, 1, 4, 1], [5, 2, 2, 1], [5, 2, 8, 1], [8, 2, 8, 1], [10, 1, 4, 3], [10, 1, 16, 1], [10, 2, 2, 3], [10, 2, 8, 4], [10, 2, 32, 1], [20, 2, 4, 4], [20, 2, 8, 2], [20, 2, 16, 2], [20, 2, 32, 1], [20, 20, 32, 1], [40, 2, 32, 2], [40, 2, 128, 1]], 'aut_supersolvable': True, 'aut_tex': 'C_5:(C_4^2\\times C_2^4.C_2^6.C_2)', 'autcent_abelian': False, 'autcent_cyclic': False, 'autcent_exponent': 4, 'autcent_group': None, 'autcent_hash': 7177616586376182635, 'autcent_nilpotent': True, 'autcent_order': 1024, 'autcent_solvable': True, 'autcent_split': False, 'autcent_supersolvable': True, 'autcent_tex': 'C_2^5.C_2^5', 'autcentquo_abelian': False, 'autcentquo_cyclic': False, 'autcentquo_exponent': 20, 'autcentquo_group': '160.207', 'autcentquo_hash': 207, 'autcentquo_nilpotent': False, 'autcentquo_order': 160, 'autcentquo_solvable': True, 'autcentquo_supersolvable': True, 'autcentquo_tex': 'D_4\\times F_5', 'cc_stats': [[1, 1, 1], [2, 1, 7], [4, 2, 4], [4, 20, 8], [5, 1, 4], [5, 2, 10], [8, 2, 8], [10, 1, 28], [10, 2, 70], [20, 2, 96], [20, 20, 32], [40, 2, 192]], 'center_label': '40.14', 'center_order': 40, 'central_product': True, 'central_quotient': '40.6', 'commutator_count': 1, 'commutator_label': '20.2', 'complements_known': True, 'complete': False, 'complex_characters_known': True, 'composition_factors': ['2.1', '2.1', '2.1', '2.1', '2.1', '2.1', '5.1', '5.1'], 'composition_length': 8, 'conjugacy_classes_known': True, 'counter': 4717, 'cyclic': False, 'derived_length': 2, 'dihedral': False, 'direct_factorization': [['160.25', 1], ['2.1', 1], ['5.1', 1]], 'direct_product': True, 'div_stats': [[1, 1, 1, 1], [2, 1, 1, 7], [4, 2, 1, 4], [4, 20, 2, 4], [5, 1, 4, 1], [5, 2, 2, 1], [5, 2, 4, 2], [8, 2, 2, 4], [10, 1, 4, 7], [10, 2, 2, 7], [10, 2, 4, 14], [20, 2, 4, 8], [20, 2, 8, 8], [20, 20, 8, 4], [40, 2, 8, 8], [40, 2, 16, 8]], 'element_repr_type': 'PC', 'elementary': 1, 'eulerian_function': 7812, 'exponent': 40, 'exponents_of_order': [6, 2], 'factors_of_aut_order': [2, 5], 'factors_of_order': [2, 5], 'faithful_reps': [], 'familial': False, 'frattini_label': '8.2', 'frattini_quotient': '200.50', 'hash': 4717, 'hyperelementary': 1, 'id': 208272, 'inner_abelian': False, 'inner_cyclic': False, 'inner_exponent': 20, 'inner_gen_orders': [1, 2, 20], 'inner_gens': [[1, 2, 40], [1, 2, 1560], [1, 82, 40]], 'inner_hash': 6, 'inner_nilpotent': False, 'inner_order': 40, 'inner_split': False, 'inner_tex': 'D_{20}', 'inner_used': [2, 3], 'irrC_degree': -1, 'irrQ_degree': -1, 'irrQ_dim': -1, 'irrR_degree': -1, 'irrep_stats': [[1, 80], [2, 380]], 'label': '1600.4717', 'linC_count': None, 'linC_degree': None, 'linFp_degree': None, 'linFq_degree': None, 'linQ_degree': None, 'linQ_degree_count': None, 'linQ_dim': None, 'linQ_dim_count': None, 'linR_count': None, 'linR_degree': None, 'maximal_subgroups_known': True, 'metabelian': True, 'metacyclic': False, 'monomial': True, 'name': 'C10^2.D8', 'ngens': 8, 'nilpotency_class': -1, 'nilpotent': False, 'normal_counts': [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], 'normal_index_bound': 0, 'normal_order_bound': 0, 'normal_subgroups_known': True, 'number_autjugacy_classes': 38, 'number_characteristic_subgroups': 50, 'number_conjugacy_classes': 460, 'number_divisions': 88, 'number_normal_subgroups': 174, 'number_subgroup_autclasses': 146, 'number_subgroup_classes': 336, 'number_subgroups': 1012, 'old_label': None, 'order': 1600, 'order_factorization_type': 32, 'order_stats': [[1, 1], [2, 7], [4, 168], [5, 24], [8, 16], [10, 168], [20, 832], [40, 384]], 'outer_abelian': False, 'outer_cyclic': False, 'outer_equivalence': True, 'outer_exponent': 4, 'outer_gen_orders': [2, 4, 4, 4, 4, 4, 4], 'outer_gen_pows': [400, 400, 640, 0, 400, 400, 0], 'outer_gens': [[21, 422, 360], [21, 687, 360], [801, 746, 460], [1, 567, 140], [821, 946, 1340], [821, 623, 1181], [21, 46, 941]], 'outer_group': None, 'outer_hash': 2311992243516436433, 'outer_nilpotent': True, 'outer_order': 4096, 'outer_permdeg': 512, 'outer_perms': 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'outer_solvable': True, 'outer_supersolvable': True, 'outer_tex': 'C_2^6.C_2^6', 'pc_rank': 3, 'perfect': False, 'permutation_degree': 24, 'pgroup': 0, 'primary_abelian_invariants': [2, 2, 4, 5], 'quasisimple': False, 'rank': 3, 'rational': False, 'rational_characters_known': True, 'ratrep_stats': [[1, 8], [2, 8], [4, 20], [8, 28], [16, 16], [32, 8]], 'representations': {'PC': {'code': 290384322330460313821404949306737213965059, 'gens': [1, 2, 5], 'pres': [8, -2, -2, -2, -5, -2, -2, -2, -5, 41, 66, 31212, 116, 36493, 141, 40334, 166, 40975]}, 'GLZN': {'d': 2, 'p': 88, 'gens': [685345, 59633727, 681481, 44295745, 6133257, 23080123, 30666285, 683409]}, 'Perm': {'d': 24, 'gens': [3530141170952852708695, 2789745235200, 30508603990072182374400, 859438, 55183326995350794240000, 2789705318400, 83380788961904738304000, 1274352]}}, 'schur_multiplier': [2, 2, 2], 'semidirect_product': True, 'simple': False, 'smith_abelian_invariants': [2, 2, 20], 'solvability_type': 7, 'solvable': True, 'subgroup_inclusions_known': True, 'subgroup_index_bound': 0, 'supersolvable': True, 'sylow_subgroups_known': True, 'tex_name': 'C_{10}^2.D_8', 'transitive_degree': 320, 'wreath_data': None, 'wreath_product': False}