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arxiv: math/0506262 · v2 · pith:MSBYOQ7Lnew · submitted 2005-06-14 · 🧮 math.RA · math.RT

Homological properties of color Lie superalgebras

classification 🧮 math.RA math.RT
keywords mathcallimfunccoloralgebraauslander-gorensteincharacteristicclassicalcohen-macaulay
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Let $\mathcal{L}=\mathcal{L}_{+}\oplus \mathcal{L}_{-}$ be a finite dimensional color Lie superalgebra over a field of characteristic 0 with universal enveloping algebra $U(\mathcal{L})$. We show that $\limfunc{gldim}(U(\mathcal{L}_{+}))= \limfunc{lFPD}(U(\mathcal{L}))= \limfunc{rFPD}(U(\mathcal{L}))= \limfunc{injdim}_{U(\mathcal{L})}(U(\mathcal{L}))= \dim (\mathcal{L}_{+})$. We also prove that $U(\mathcal{L})$ is Auslander-Gorenstein and Cohen-Macaulay and thus that it has a QF classical quotient ring.

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