On the Stanley depth of squarefree monomial ideals

Abstract

Let K be a field and S=K[x1,…,xn] be the polynomial ring in n variables over the field K. Suppose that C is a chordal clutter with n vertices and assume that the minimum edge cardinality of C is at least d. It is shown that S/I(cd(C)) satisfies Stanley's conjecture, where I(cd(C)) is the edge ideal of the d-complement of C. This, in particular shows that S/I satisfies Stanley's conjecture, where I is a quadratic monomial ideal with linear resolution. We also define the notion of Schmitt--Vogel number of a monomial ideal I, denoted by sv(I) and prove that for every squarefree monomial ideal I, the inequalities sdepth(I)≥ n- sv(I)+1 and sdepth(S/I)≥ n- sv(I) hold.