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gptkb:Z/2Z
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Z
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gptkb:Projective_Symplectic_Group_of_degree_2n_over_field_of_order_q
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center of Sp(2n, q)
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gptkb:SL(2,ℤ)/{±I}
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gptkb:SL(2,ℤ)
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gptkb:PSO(2)
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{±I}
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gptkb:PGL(2,_C)
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gptkb:GL(2,_C)
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gptkb:PGL(2,C)
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SL(2,C) by {±I}
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gptkb:PSL(n,_C)
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center of SL(n, C)
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gptkb:PGL(n,C)
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center of GL(n,C)
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gptkb:SL(2,ℝ)
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gptkb:PSL(2,ℝ)
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gptkb:projective_linear_group_PGL(n+1)
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general linear group GL(n+1)
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gptkb:Special_Linear_Group_of_3x3_Complex_Matrices
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Projective Special Linear Group PSL(3, C)
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gptkb:PGL(n,_C)
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C* (nonzero complex numbers)
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gptkb:Z/3Z
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gptkb:3Z
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gptkb:symmetric_group_S_n_(n_≥_3)
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A_n gives C_2 (for n ≥ 2)
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gptkb:complex_projective_space_CP^{n-1}
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C^n \ {0} by C^*
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gptkb:general_linear_group_GL(m,q)_for_m_>_2n
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projective general linear group PGL(m,q)
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gptkb:PSL_n(q)
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center of SL_n(q)
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gptkb:GL_n(C)
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PGL_n(C)
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gptkb:PSL(3,Z)
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gptkb:SL(3,Z)
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gptkb:PGL(2,_R)
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gptkb:GL(2,_R)
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