Boundedness of Cohomology

Abstract

Let d ∈ and let d denote the class of all pairs (R,M) in which R = n ∈ 0 Rn is a Noetherian homogeneous ring with Artinian base ring R0 and such that M is a finitely generated graded R-module of dimension ≤ d. The cohomology table of a pair (R,M) ∈ d is defined as the family of non-negative integers dM:= (diM(n))(i,n) ∈ × . We say that a subclass C of d is of finite cohomology if the set \dM (R,M) ∈ \ is finite. A set S ⊂eq \0,... ,d-1\× is said to bound cohomology, if for each family (hσ)σ ∈ S of non-negative integers, the class \(R,M) ∈ d diM(n) ≤ h(i,n) for all (i,n) ∈ S\ is of finite cohomology. Our main result says that this is the case if and only if S contains a quasi diagonal, that is a set of the form \(i,ni)| i=0,..., d-1\ with integers n0> n1 > ... > nd-1. We draw a number of conclusions of this boundedness criterion.