Gorenstein homogeneous subrings of graphs

Abstract

Let G=(V,E) be a connected simple graph, with n vertices such that S is its homogeneous monomial subring. We prove that if S is normal and Gorenstein, then G is unmixed with cover number n2 and G has a strong n2-τ-reduction. Furthermore, if n is even, then we show that G is bipartite. Finally, if S is normal and G is unmixed whose cover number is n2, we give sufficient conditions for S to be Gorenstein.

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