On Cohomologically Complete Intersections in Cohen-Macaulay Rings

Abstract

An ideal I of a local Cohen-Macaulay ring R is called a cohomologically complete intersection if HiI(R) = 0 for all i ≠ c = height(I). Here HiI(R), i ∈ Z denotes the local cohomology of R with respect to I. For instance, a set-theoretic complete intersection is a cohomologically complete intersection. Here we study cohomologically complete intersections from various homological points of view. As a main result it is shown that the vanishing HiI(M) = 0 for all i ≠ c is completely encoded in homological properties of HcI(M). These results extend those of Hellus and Schenzel (see [13, Theorem 0.1]) shown in the case of a local Gorenstein ring. In particular we get a characterization of cohomologically complete intersections in a Cohen-Macaulay ring in terms of the canonical module.