Associated primes of graded components of local cohomology modules

Abstract

The i-th local cohomology module of a finitely generated graded module M over a standard positively graded commutative Noetherian ring R, with respect to the irrelevant ideal R+, is itself graded; all its graded components are finitely generated modules over R0, the component of R of degree 0. This paper is concerned with the asymptotic behaviour of R0(HiR+(M)n) as n -∞. The smallest i for which such study is interesting is the finiteness dimension f of M relative to R+, defined as the least integer j for which HjR+(M) is not finitely generated. Brodmann and Hellus have shown that R0(HfR+(M)n) is constant for all n < < 0 (that is, in their terminology, R0(HfR+(M)n) is asymptotically stable for n -∞). The first main aim of this paper is to identify the ultimate constant value (under the mild assumption that R is a homomorphic image of a regular ring): our answer is precisely the set of contractions to R0 of certain relevant primes of R whose existence is confirmed by Grothendieck's Finiteness Theorem for local cohomology. Brodmann and Hellus raised various questions about such asymptotic behaviour when i > f. They noted that Singh's study of a particular example (in which f = 2) shows that R0(H3R+(R)n) need not be asymptotically stable for n -∞. The second main aim of this paper is to determine, for Singh's example, R0(H3R+(R)n) quite precisely for every integer n, and, thereby, answer one of the questions raised by Brodmann and Hellus.

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