Alternative names (9)
abelian • is non-abelian • isAbelian • isAbelianGroup • isNonAbelianFor • isNonabelian • non-abelian • nonAbelian • notAbelianRandom triples
| Subject | Object |
|---|---|
| gptkb:general_linear_group_GL(n+1,C) | true |
| gptkb:Z_2_×_Z_2 | true |
| gptkb:Mathieu_group_M21 | true |
| gptkb:projective_special_linear_group_PSL(n,C) | true (for n>2) |
| gptkb:Special_Unitary_Group_of_degree_3 | true |
| gptkb:Projective_Special_Linear_Group_of_degree_2 | true (for q > 2) |
| gptkb:modular_group_SL(2,ℤ) | true |
| gptkb:classical_braid_group | true |
| gptkb:Special_Linear_Group_of_degree_n_over_the_complex_numbers | for n >= 2 |
| gptkb:projective_linear_group_PGL(3,2) | true |
| gptkb:real_K-theory | yes |
| gptkb:dihedral_group_of_order_2^{n+1} | true |
| gptkb:alternating_group_A_8 | true |
| gptkb:U(3)_group | true |
| gptkb:\mathbb{Z} | true |
| gptkb:L_2(7) | true |
| gptkb:GL(n,_K) | true for n > 1 |
| gptkb:SL(3,C) | true |
| gptkb:GL(n+1,_C) | true |
| gptkb:symmetric_group_S_n_(n_≥_3) | true |