On the depth of symbolic powers of edge ideals of graphs

Abstract

Assume that G is a graph with edge ideal I(G) and star packing number α2(G). We denote the s-th symbolic power of I(G) by I(G)(s). It is shown that the inequality depth S/(I(G)(s))≥ α2(G)-s+1 is true for every chordal graph G and every integer s≥ 1. Moreover, it is proved that for any graph G, we have depth S/(I(G)(2))≥ α2(G)-1.