Ordered alternating paths and the depth of symbolic powers of cover ideals of graphs

Abstract

Let G be a simple graph with cover ideal J(G) in a polynomial ring S in |V(G)| variables. For a matching M of G, we denote by (M) the length of the longest M-alternating path in G. We define αt(G) to be the maximum size of an ordered matching M of G such that (M) 2t-1. We then prove that depth(S/J(G)(t)) |V(G)| - 1 - αt(G) for all t 1, where J(G)(t) denotes the t-th symbolic power of J(G), and that equality holds when G is a forest.

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