On the depth and Stanley depth of integral closure of powers of monomial ideals

Abstract

Let K be a field and S=K[x1,…,xn] be the polynomial ring in n variables over K. Assume that G is a graph with edge ideal I(G). We prove that the modules S/I(G)k and I(G)k/I(G)k+1 satisfy Stanley's inequality for every integer k 0. If G is a non-bipartite graph, we show that the ideals I(G)k satisfy Stanley's inequality for all k 0. For every connected bipartite graph G (with at least one edge), we prove that sdepth(I(G)k)≥ 2, for any positive integer k≤ girth(G)/2+1. This result partially answers a question asked in [20]. For any proper monomial ideal I of S, it is shown that the sequence \ depth(Ik/Ik+1)\k=0∞ is convergent and k→∞ depth(Ik/Ik+1)=n-(I), where (I) denotes the analytic spread of I. Furthermore, it is proved that for any monomial ideal I, there exists an integer s such that depth (S/Ism) ≤ depth (S/I),for every integer m≥ 1. We also determine a value s for which the above inequality holds. If I is an integrally closed ideal, we show that depth(S/Im)≤ depth(S/I), for every integer m≥ 1. As a consequence, we obtain that for any integrally closed monomial ideal I and any integer m≥ 1, we have Ass(S/I)⊂eq Ass(S/Im). abstract