Embedded Associated Primes of Powers of Square-free Monomial Ideals

Abstract

An ideal I in a Noetherian ring R is normally torsion-free if Ass(R/It)=Ass(R/I) for all natural numbers t. We develop a technique to inductively study normally torsion-free square-free monomial ideals. In particular, we show that if a square-free monomial ideal I is minimally not normally torsion-free then the least power t such that It has embedded primes is bigger than beta1, where beta1 is the monomial grade of I, which is equal to the matching number of the hypergraph H(I) associated to I. If in addition I fails to have the packing property, then embedded primes of It do occur when t=beta1 +1. As an application, we investigate how these results relate to a conjecture of Conforti and Cornu\'ejols.