Cohen-Macaulay-ness in codimension for bipartite graphs

Abstract

Let G be an unmixed bipartite graph of dimension d-1. Assume that Kn,n, with n 2, is a maximal complete bipartite subgraph of G of minimum dimension. Then G is Cohen-Macaulay in codimension d-n+1. This generalizes a characterization of Cohen-Macaulay bipartite graphs by Herzog and Hibi and a result of Cook and Nagel on unmixed Buchsbaum graphs. Furthermore, we show that any unmixed bipartite graph G which is Cohen-Macaulay in codimension t, is obtained from a Cohen-Macaulay graph by replacing certain edges of G with complete bipartite graphs. We provide some examples.