Symbolic powers and generalized-parametric decomposition of monomial ideals on regular sequences

Abstract

Let R be a commutative Noetherian ring and let x :=x1,…,xd be a regular R-sequence contained in the Jacobson radical of R. An ideal I of R is said to be a monomial ideal with respect to x if it is generated by a set of monomials x1e1… xded. It is shown that, if xR is a prime ideal of R, then each monomial ideal I has a canonical and unique decomposition as an irredundant finite intersection of primary ideals of the form xe1τ(1)R+…+xesτ(s)R, where τ is a permutation of \1,…,d\, s∈\1,…,d\ and e1,…,es are the positive integers. This generalizes and provides a short proof of the main results of HMRS, HRS. Also, we show that for every integer k≥1, I(k)=Ik, if and only if R R/Ik ⊂eq R R/I, whenever I is a squarefree monomial ideal, where I(k) is the kth symbolic power of I. Moreover, in this circumstance it is shown that all powers of I are integrally closed.