Local Homology, Cohen-Macaulayness and Cohen-Macaulayfications
Abstract
Let (R,m) be a local, complete ring, X an artinian R-module of Noetherian dimension d; let x1,...,xd∈ m be such that 0:X (x1,...,xd)R has finite length. Then Hxd(X) is a finite R-module, providing a positive answer to a question posed by Tang. As a first application of this result corollory 1 contains a necessary condition for a finite module to be CM; secondly we propose a notion of Cohen-Macaulayfication and prove its uniqueness (th. 3); finally we show that this new notion of Cohen-Macaulayfication is a direct generalization of a notion of Cohen-Macaulayfication introduced by Goto (th. 4).
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