Hilbert-Samuel functions of modules over Cohen-Macaulay rings

Abstract

For a finitely generated, non-free module M over a CM local ring (R,,k), it is proved that for n 0 the length of 1RMR/n+1 is given by a polynomial of degree R-1. The vanishing of iRMN/n+1N is studied, with a view towards answering the question: if there exists a finitely generated R-module N with N 1 such that the projective dimension or the injective dimension of N/n+1N is finite, then is R-regular? Upper bounds are provided for n beyond which the question has an affirmative answer.

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