Graded components of local cohomology modules over polynomial rings

Abstract

Let K be a field and let R = K[X1, …, Xm] with m ≥ 2. Give R the standard grading. Let I be a homogeneous ideal of height g. Assume 1 ≤ g ≤ m -1. Suppose HiI(R) ≠ 0 for some i ≥ 0. We show (1) HiI(R)n ≠ 0 for all n ≤ -m. (2) if Supp HiI(R) ≠ \ (X1, …, Xm)\ then HiI(R)n ≠ 0 for all n ∈ Z. Furthermore if char K = 0 then K HiI(R)n is infinite for all n ∈ Z. (3) K HgI(R)n is infinite for all n ∈ Z. In fact we prove our results for T(R) where T(-) is a large sub class of graded Lyubeznik functors

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