Simplicial complexes of whisker type

Abstract

Let I⊂ K[x1,…,xn] be a zero-dimensional monomial ideal, and (I) be the simplicial complex whose Stanley--Reisner ideal is the polarization of I. It follows from a result of Soleyman Jahan that (I) is shellable. We give a new short proof of this fact by providing an explicit shelling. Moreover, we show that (I) is even vertex decomposable. The ideal L(I), which is defined to be the Stanley--Reisner ideal of the Alexander dual of (I), has a linear resolution which is cellular and supported on a regular CW-complex. All powers of L(I) have a linear resolution. We compute depth\ L(I)k and show that depth\ L(I)k=n for all k≥ n.