Some Combinatorial Characterizations of Gorenstein Graphs with Independence Number Less than Four

Abstract

Let α=α(G) be the independence number of a simple graph G with n vertices and I(G) be its edge ideal in S=K[x1,…, xn]. If S/I(G) is Gorenstein, the graph G is called Gorenstein over K and if G is Gorenstein over every field, then we simply say that G is Gorenstein. In this article, first we state a condition equivalent to G being Gorenstein and using this we give a characterization of Gorenstein graphs with α=2. Then we present some properties of Gorenstein graphs with α=3 and as an application of these results we characterize triangle-free Gorenstein graphs with α=3.