Local cohomology modules of a regular affine domain
Abstract
For a Noetherian commutative ring R, let HiI(R) be the i-th local cohomology module of R with respect to I. In Hel-08, Hellus posed the question of identifying rings R such that injdimR HiI(R)=dimR(SuppR HiI(R)). In this paper, we show that a regular affine domain over a field of characteristic 0 satisfies this condition. In fact, we prove that injdimR HiI(R)≥ dimR(SuppR HiI(R))-1 when R is a differentiably admissible K-algebra. Indeed, we establish both of these conclusions for a substantially broad class of functors known as Lyubeznik functors. We also prove that if R is a polynomial ring over a differentiably admissible K-algebra, then AssR HiI(R) is finite for all i≥ 0 and for every ideal I of R.
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