The behavior of Stanley depth under polarization

Abstract

Let K be a field, R=K[X1, ..., Xn] be the polynomial ring and J ⊂neq I two monomial ideals in R. In this paper we show that sdepth\ I/J - depth\ I/J = sdepth\ Ip/Jp-depth\ Ip/Jp, where sdepth\ I/J denotes the Stanley depth and Ip denotes the polarization. This solves a conjecture by Herzog and reduces the famous Stanley conjecture (for modules of the form I/J) to the squarefree case. As a consequence, the Stanley conjecture for algebras of the form R/I and the well-known combinatorial conjecture that every Cohen-Macaulay simplicial complex is partitionable are equivalent.