Filtrations and Growth of G-modules

Abstract

We investigate infinite dimensional modules for an affine group scheme G of finite type over a field of positive characteristic p. For any subspace X ⊂ O( G) of the coordinate algebra of G, we consider the abelian subcategory Mod( G,X) ⊂ Mod( G) of ``X-comodules" and the left exact functor (-)X: Mod( G) Mod( G,X) which is right adjoint to the inclusion functor. We employ ``ascending converging sequences" \ Xi \ of subspaces of O( G) to provide functorial filtrations \ MXi \ of each G-module M. A G-module M is injective if and only if each MXi is an injective Xi-comodule for some (or, equivalently, for all) such \ Xi \. We consider the explicit ascending converging sequence \ O( G)≤ d,φ \ of finite dimensional subcoalgebras of O( G) depending upon a closed embedding φ: G \ \ GLN. Of particular interest to us are mock injective G-modules, modules whose support varieties are empty. Restrictions of a G-module to each O( G)≤ d,φ provide new invariants for G-modules. For cofinite G-modules M, we explore the the growth of d M O( G)≤ d,φ.