Idempotent modules, locus of compactness and local supports

Abstract

Let kG be the group algebra of a finite group scheme defined over a field k of characteristic p>0. Associated to any closed subset V of the projectivized prime ideal spectrum Proj H*(G,k) is a thick tensor ideal subcategory of the stable category of finitely generated kG-module, whose closure under arbitrary direct sums is a localizing tensor ideal in the stable category of all kG-modules. The colocalizing functor from the big stable category to this localizing subcategory is given by tensoring with an idempotent module E. A property of the idempotent module is that its restriction along any flat map α:k[t]/(tp) kG is a compact object. For any kG-module M, we define its locus of compactness in terms of such restrictions. With some added hypothesis, in the case that V is a closed point, for a kG-module M, we show that in the stable category Hom(E, M) is finitely generated over the endomorphism ring of E, provided the restriction along an associated flat map is a compact object. This leads to a notion of local supports. We prove some of its properties and give a realization theorem.