Koszulness, Krull Dimension and Other Properties of Graph-Related Algebras

Abstract

The algebra of basic covers of a graph G, denoted by (G), was introduced by Juergen Herzog as a suitable quotient of the vertex cover algebra. In this paper we show that if the graph is bipartite then (G) is a homogeneous algebra with straightening laws and thus is Koszul. Furthermore, we compute the Krull dimension of (G) in terms of the combinatorics of G. As a consequence we get new upper bounds on the arithmetical rank of monomial ideals of pure codimension 2. Finally, we characterize the Cohen-Macaulay property and the Castelnuovo-Mumford regularity of the edge ideal of a certain class of graphs.