Graded Local Cohomology: Attached and Associated Primes, Asymptotic Behaviors

Abstract

Assume that R = i∈ N0 Ri is a homogeneous graded Noetherian ring, and that M is a Z--graded R--module, where N0 (resp. Z) denote the set all non--negative integers (resp. integers). The set of all homogeneous attached prime ideals of the top non--vanishing local cohomology module of a finitely generated module M, R+c(M), with respect to the irrelevant ideal R+: =i≥ 1 Ri and the set of associated primes of R+i(M) is studied. The asymptotic behavior of R(R/R+, R+s(M)) for s ≥ f(M) is discussed, where f(M) is the finiteness dimension of M. It is shown that R+h(M) is tame if R+i(M) is Artinian for all i > h.

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