Abelian category of cominimax modules and local cohomology

Abstract

Let R be a commutative Noetherian ring, an ideal of R, M an arbitrary R-module and X a finite R-module. We prove that the category of -cominimax modules is a Melkersson subcategory of R-modules whenever R≤ 1 and is an Abelian subcategory whenever R≤ 2. We prove a characterization theorem for i(M) and i(X,M) to be -cominimax for all i, whenever one of the following cases holds: (a) ()≤ 1, (b) R/ ≤ 1 or (c) R≤ 2.