On homological invariants and Cohen-Macaulayness of closed neighborhood ideals

Abstract

Let G be a finite simple graph and NI(G) be the closed neighborhood ideal of G in the polynomial ring S=K[V(G)]. In this paper, we study the Castelnuovo-Mumford regularity, projective dimension and Cohen-Macaulayness of this ideal. For any chordal graph G, we show that reg(S/NI(G))=τ(G), where τ(G) denotes the vertex cover number of G. This generalizes the corresponding result for trees shown in [3], as in trees τ(G) is the same as the matching number of G. When G is a bipartite graph or a very well-covered graph, we notice that reg(S/NI(G))≥ τ(G) and that this inequality can be strict in general. Moreover, we describe the projective dimension of S/NI(G) for some families of graphs. Finally, we give a characterization of very well-covered graphs G for which the ring S/NI(G) is Cohen-Macaulay.