On endomorphism rings and dimensions of local cohomology modules

Abstract

Let (R, m) denote an n-dimensional complete local Gorenstein ring. For an ideal I of R let HiI(R), i ∈ Z, denote the local cohomology modules of R with respect to I. If HiI(R) = 0 for all i = c = I, then the endomorphism ring of HcI(R) is isomorphic to R (cf. HSt and HS). Here we prove that this is true if and only if HiI(R) = 0, i = n, n -1 provided c ≥ 2 and R/I has an isolated singularity resp. if I is set-theoretically a complete intersection in codimension at most one. Moreover, there is a vanishing result of HiI(R) for all i > m, m a given integer, resp. an estimate of the dimension of HiI(R).