Castelnuovo-Mumford regularity and cohomological dimension

Abstract

Let R=i∈ 0Rn be a standard graded ring, R+ :=i∈ Rn be the irrelevant ideal of R and 0 be an ideal of R0. In this paper, as a generalization of the concept of Castelnouvo-Mumford regularity (M) of a finitely generated graded R-module M, we define the regularity of M with respect to 0+ R+, say _0+ R+(M). And we study some relations of this new invariant with the classic one. To this end, we need to consider the cohomological dimension of some finitely generated R0-modules. Also, we will express _0+ R+(M) in terms of some invariants of the minimal graded free resolution of M and see that in a special case this invariant is independent of the choice of 0.