Castelnuovo-Mumford regularity of deficiency modules

Abstract

Let d ∈ and let M be a finitely generated graded module of dimension ≤ d over a Noetherian homogeneous ring R with local Artinian base ring R0. Let (M), (M) and (M) respectively denote the beginning, the generating degree and the Castelnuovo-Mumford regularity of M. If i ∈ 0 and n ∈ Z, let diM(n) denote the R0-length of the n-th graded component of the i-th R+-transform module DiR+(M) of M and let Ki(M) denote the i-th deficiency module of M. Our main result says, that (Ki(M)) is bounded in terms of (M) and the "diagonal values" djM(-j) with j = 0,..., d-1. As an application of this we get a number of further bounding results for (Ki(M)).