On an endomorphism ring of local cohomology

Abstract

Let I be an ideal of a local ring (R, m) with d = R. For the local cohomology module HiI(R) it is a well-known fact that it vanishes for i > d and is an Artinian R-module for i = d. In the case that the Hartshorne-Lichtenbaum Vanishing Theorem fails, that is HdI(R) = 0, we explore its fine structure. In particular, we investigate its endomorphism ring and related connectedness properties. In the case R is complete we prove - as a technical tool - that HdI(R) Hd m(R/J) for a certain ideal J ⊂ R. Thus, properties of HdI(R) and its Matlis dual might be described in terms of the local cohomology supported in the maximal ideal.