Local homology, finiteness of Tor modules and cofiniteness

Abstract

Let a be an ideal of a commutative noetherian ring R with unity and M an R-module supported at (). Let n be the supermum of the integers i for which Hi(M)≠ 0. We show that M is -cofinite if and only if the R-module Ri(R/,M) is finitely generated for every 0≤ i≤ n. This provides a hands-on and computable finitely-many-steps criterion to examine a-confiniteness. Our approach relies heavily on the theory of local homology which demonstrates the effectiveness and indispensability of this tool.