Alternative names (9)
abelian • is non-abelian • isAbelian • isAbelianGroup • isNonAbelianFor • isNonabelian • non-abelian • nonAbelian • notAbelianRandom triples
| Subject | Object |
|---|---|
| gptkb:GL_n(Z) | true (for n > 1) |
| gptkb:GL_1(C) | true |
| gptkb:Z_6 | true |
| gptkb:symmetric_group_S_{n+1} | true (for n+1 > 2) |
| gptkb:S_4 | true |
| gptkb:Suzuki_group | true |
| gptkb:Z_7 | true |
| gptkb:GL(2,_ℂ) | true |
| gptkb:cyclic_group_of_order_9_(when_over_complex_numbers) | true |
| gptkb:A_n_(alternating_group) | false |
| gptkb:symmetric_group_S_3 | false |
| gptkb:G_2(q) | true |
| gptkb:S_5_×_S_4 | true |
| gptkb:cyclic_group_of_order_5 | true |
| gptkb:Projective_Special_Linear_Group_of_2x2_matrices_over_the_complex_numbers | true |
| gptkb:projective_special_linear_group_PSL(4,2) | true |
| gptkb:Projective_Special_Linear_Group_of_degree_2 | true (for q > 2) |
| gptkb:GL_{2n}(F) | yes |
| gptkb:general_linear_group_GL(9) | true |
| gptkb:S_3 | true |