On the Castelnuovo-Mumford regularity of symbolic powers of cover ideals

Abstract

Assume that G is a graph with cover ideal J(G). For every integer k≥ 1, we denote the k-th symbolic power of J(G) by J(G)(k). We provide a sharp upper bound for the regularity of J(G)(k) in terms of the star packing number of G. Also, for any integer k≥ 2, we study the difference between reg(J(G)(k)) and reg(J(G)(k-2)). As a consequence, we compute the regularity of J(G)(k) when G is a doubly Cohen-Macaulay graph. Furthermore, we determine reg(J(G)(k)) if G is either a Cameron-Walker graph or a claw-free graph which has no cycle of length other that 3 and 5.