Annihilators of (co)homology and their influence on the trace Ideal

Abstract

Let (R,m) be a commutative Noetherian local ring, and suppose R is Cohen-Macaulay with canonical module ωR. We develop new tools for analyzing questions involving annihilators of several homologically defined objects. Using these, we study a generalization introduced by Dao-Kobayashi-Takahashi of the famous Tachikawa conjecture, asking in particular whether the vanishing of m ExtRi(ωR,R) should force the trace ideal of ωR to contain m, i.e., for R to be nearly Gorenstein. We show this question has an affirmative answer for numerical semigroup rings of minimal multiplicity, but that the answer is negative in general. Our proofs involve a technical analysis of homogeneous ideals in a numerical semigroup ring, and exploit the behavior of Ulrich modules in this setting.