On graded local cohomology modules defined by a pair of ideals
Abstract
Let R = n ∈ N0 Rn be a standard graded ring, M be a finite graded R-module and J be a homogenous ideal of R. In this paper we study the graded structure of the i-th local cohomology module of M defined by a pair of ideals (R+,J), i.e. HiR+,J(M). More precisely, we discuss finiteness property and vanishing of the graded components HiR+,J(M)n. Also, we study the Artinian property and tameness of certain submodules and quotient modules of HiR+,J(M).
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