Gorenstein on the punctured spectrum and nearly Gorenstein property of the Ehrhart ring of the stable set polytope of an h-perfect graph

Abstract

In this paper, we give a criterion of the nearly Gorenstein property of the Ehrhart ring of the stable set polytope of an h-perfect graph: the Ehrhart ring of the stable set polytope of an h-perfect graph G with connected components G(1), …, G() is nearly Gorenstein if and only if (1) for each i, the Ehrhart ring of the stable set polytope of G(i) is Gorenstein and (2) |ω(G(i))-ω(G(j))|≤ 1 for any i and j, where ω(G(i)) is the clique number of G(i). We also show that the Segre product of Cohen-Macaulay graded rings with linear non-zerodivisor which are Gorenstein on the punctured spectrum is also Gorenstein on the punctured spectrum if all but one rings are standard graded.