Homological properties of color Lie superalgebras
Abstract
Let L=L+ L- be a finite dimensional color Lie superalgebra over a field of characteristic 0 with universal enveloping algebra U(L). We show that gldim(U(L+))= lFPD(U(L))= rFPD(U(L))= injdimU(L)(U(L))= (L+). We also prove that U(L) is Auslander-Gorenstein and Cohen-Macaulay and thus that it has a QF classical quotient ring.
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