Tame Loci of Certain Local Cohomology Modules
Abstract
Let M be a finitely generated graded module over a Noetherian homogeneous ring R = n ∈ N0Rn. For each i ∈ N0 let HiR+(M) denote the i-th local cohomology module of M with respect to the irrelevant ideal R+ = n > 0 Rn of R, furnished with its natural grading. We study the tame loci i(M)≤ 3 at level i ∈ N0 in codimension ≤ 3 of M, that is the sets of all primes 0 ⊂ R0 of height ≤ 3 such that the graded R_0-modules HiR+(M)_0 are tame.
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