On Lyubeznik's invariants and endomorphisms of local cohomology modules

Abstract

Let (R, m) denote an n-dimensional Gorenstein ring. For an ideal I ⊂ R of height c we are interested in the endomorphism ring B = R(HcI(R), HcI(R)). It turns out that B is a commutative ring. In the case of (R, m) a regular local ring containing a field B is a Cohen-Macaulay ring. Its properties are related to the highest Lyubeznik number l = k Rd(k,HcI(R)). In particular R B if and only if l = 1. Moreover, we show that the natural homomorphism Rd(k, HcI(R)) k is non-zero.