Alternative names (12)
hasQuotient • is a quotient of • isQuotientBy • isQuotientGroup • isQuotientGroupOf • quotient • quotientBy • quotientByCenter • quotientGroup • quotientGroupOf • quotientOf • quotientedBy • moreRandom triples
| Subject | Object |
|---|---|
| gptkb:PGL_4(3) | GL_4(3) |
| gptkb:GL(2,_C) | gptkb:PGL(2,_C) |
| gptkb:GL(n+1,_C) | PGL(n+1, C) |
| gptkb:PSL(2,9) | SL(2,9) |
| gptkb:projective_special_linear_group_PSL(n,q) | gptkb:special_linear_group_SL(n,q) |
| gptkb:modular_group_PSL(2,ℤ) | gptkb:SL(2,ℤ) |
| gptkb:projective_general_linear_group_PGL(2n,q) | center of GL(2n,q) |
| gptkb:PSL(2,_Z/pZ) | gptkb:SL(2,_Z/pZ) |
| gptkb:PGL(n,_F) | gptkb:GL(n,_F) |
| gptkb:PSL(n,_C) | gptkb:SL(n,_C) |
| gptkb:complex_Stiefel_manifold | U(n)/U(n-k) |
| gptkb:Projective_linear_group_PGL(2,_C) | gptkb:C* |
| gptkb:PSL(3,_Z) | gptkb:SL(3,_Z) |
| gptkb:SL(2,_Z)/{±I} | {±I} |
| gptkb:PGL(n,q) | gptkb:GL(n,q) |
| gptkb:Conway_group_Co1 | gptkb:Conway_group_Co0 |
| gptkb:PSL(n,Z) | center of SL(n,Z) |
| gptkb:projective_semilinear_group_PΓL(n,q) | general semilinear group ΓL(n,q) by scalar matrices |
| gptkb:SL(2,ℤ)_by_{±I} | gptkb:SL(2,ℤ) |
| gptkb:SL_4(3) | gptkb:PSL_4(3) |