A New Outlook on Cofiniteness

Abstract

Let a be an ideal of a commutative noetherian (not necessarily local) ring R. In the case (a,R)≤ 1, we show that the subcategory of a-cofinite R-modules is abelian. Using this and the technique of way-out functors, we show that if (a,R)≤ 1, or (R/a) ≤ 1, or (R) ≤ 2, then the local cohomology module Hia(X) is a-cofinite for every R-complex X with finitely generated homology modules and every i ∈ Z. We further answer Question 1.3 in the three aforementioned cases, and reveal a correlation between Questions 1.1, 1.2, and 1.3.