Tameness and Artinianness of Graded Generalized Local Cohomology Modules

Abstract

Let R=n≥ 0Rn, ⊃eq n> 0Rn and M and N be a standard graded ring, an ideal of R and two finitely generated graded R-modules, respectively. This paper studies the homogeneous components of graded generalized local cohomology modules. First of all, we show that for all i≥ 0, Hi(M, N)n, the n-th graded component of the i-th generalized local cohomology module of M and N with respect to , vanishes for all n 0. Furthermore, some sufficient conditions are proposed to satisfy the equality \(Hi(M, N))| i≥ 0\= \(HiR+(M, N))| i≥ 0\. Some sufficient conditions are also proposed for tameness of Hi(M, N) such that i= fR+(M, N) or i= (M, N), where fR+(M, N) and (M, N) denote the R+-finiteness dimension and the cohomological dimension of M and N with respect to , respectively. We finally consider the Artinian property of some submodules and quotient modules of Hj(M, N), where j is the first or last non-minimax level of Hi(M, N).