Quasi-Hilbert rings and Ratliff-Rush filtrations

Abstract

Let A be a non Gorenstein Cohen Macaulay ring of dimension d≥ 1, I an ideal of A, and suppose ωA is a canonical A-module. Set r(I,ωA) = n ≥ 0 (In+1 ωA : In ωA) ⊂eq A . We show that the ideal r(I,-) is ωA invariant. Motivated by this property, we introduce a new class of rings, which we call quasi Hilbert rings. We provide several examples of quasi Hilbert rings and discuss a number of their applications. Let A be a local ring with maximal ideal m. We prove that A is quasi Hilbert iff A is quasi Hilbert, where A is the completion of A w.r.t. m. If d≥ 2 and x∈ m m2 is an A ωA superficial element, we prove that if A is quasi Hilbert, then so is A/(x). Writing I for the Ratliff Rush closure of an ideal I, we also provide sufficient conditions ensuring the vanishing of r(In,ωA)/In for all n≥ 1.

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