Signature invariants of monomial ideals

Abstract

Let I be a monomial ideal of a polynomial ring R=K[x1,…,xn] over a field K and let sgn(I) be its signature ideal. If I is not a principal ideal, we show that the depth of R/I is the depth of R/ sgn(I), and the regularity of R/ sgn(I) is at most the regularity of R/I. For ideals of height at least 2, we show that the height and the associated primes of I and its signature sgn(I) are the same, and we show that I is Cohen--Macaulay (resp. Gorenstein) if and only if sgn(I) is Cohen--Macaulay (resp. Gorenstein), and furthermore we show that the v-number of sgn(I) is at most the v-number of I. We give an algorithm to compute the signature of a monomial ideal using Macaulay2, and an algorithm to examine given families of monomial ideal by computing their signature ideals and determining which of these are either Cohen--Macaulay or Gorenstein.