An Increasing normalized depth function

Abstract

Let K be a field and S=K[x1,…,xn] be the polynomial ring in n variables over K. Assume that I is a squarefree monomial ideal of S. For every integer k≥ 1, we denote the k-th squarefree power of I by I[k]. The normalized depth function of I is defined as gI(k)= depth(S/I[k])-(dk-1), where dk denotes the minimum degree of monomials belonging to I[k]. Erey, Herzog, Hibi and Saeedi Madani conjectured that for any squarefree monomial ideal I, the function gI(k) is nonincreasing. In this short note, we provide a counterexample for this conjecture. Our example in fact shows that gI(2)-gI(1) can be arbitrarily large.