isQuotientOf

URI: https://gptkb.org/prop/isQuotientOf

461 triples

GPTKB property

Alternative names (12)

hasQuotient • is a quotient of • isQuotientBy • isQuotientGroup • isQuotientGroupOf • quotient • quotientBy • quotientByCenter • quotientGroup • quotientGroupOf • more

Random triples

Subject	Object
gptkb:projective_general_linear_group_PGL(n,q)	gptkb:projective_semilinear_group_PΓL(n,q)
gptkb:PGL(2,_R)	center of GL(2, R)
gptkb:PGL(2,_R)	gptkb:GL(2,_R)
gptkb:Projective_Special_Linear_Group_of_degree_2	gptkb:Special_Linear_Group_of_degree_2
gptkb:PSp_{2n}(q)	gptkb:Sp_{2n}(q)
gptkb:Projective_linear_group_PGL(2,_C)	SL(2, C) by {±I}
gptkb:PSO(2)	{±I}
gptkb:SL(n,q)	gptkb:PSL(n,q)
gptkb:Isometry_group_of_R^n	O(n)
gptkb:PSL_2(R)	gptkb:SL_2(R)
gptkb:GL(2,3)	gptkb:PSL(2,3)
gptkb:M-theory_on_AdS4_×_S7/Zk	Zk
gptkb:PSL(n)	gptkb:SL(n)
gptkb:SU(8)/Z_2	gptkb:SU(8)
gptkb:projective_space_(all_weights_1)	scalar multiplication
gptkb:SL(n,_C)	gptkb:PSL(n,_C)
gptkb:PSL(3,_Z)	gptkb:SL(3,_Z)
gptkb:Siegel_modular_variety_with_level_N_structure	Siegel upper half-space by congruence subgroup
gptkb:SL(2,R)	gptkb:PSL(2,R)
gptkb:SL(2,_F)	PSL(2, F) = SL(2, F)/center