Faltings' finiteness dimension of local cohomology modules over local Cohen-Macaulay rings

Abstract

Let (R, m) denote a local Cohen-Macaulay ring and I a non-nilpotent ideal of R. The purpose of this article is to investigate Faltings' finiteness dimension fI(R) and equidimensionalness of certain homomorphic image of R. As a consequence we deduce that fI(R)= max\1, ht\ I\ and if mAssR(R/I) is cotained in AssR(R), then the ring R/ I+n≥ 1(0:RIn) is equidimensional of dimension R-1. Moreover, we will obtain a lower bound for injective dimension of the local cohomology module H ht\ II(R), in the case (R, m) is a complete equidimensional local ring.