Geometric Invariants of Representations of Finite Groups

Abstract

J. Pevtsova and the author constructed a ``universal p-nilpotent operator" for an infinitesimal group scheme G over a field k of characteristic p > 0 which led to coherent sheaves on the scheme of 1-parameter subgroups of G associated to a G-module M. Of special interest is the fact that these coherent sheaves are vector bundles if M is of constant Jordan type. In this paper, we provide similar invariants for a finite group τ which recover the invariants earlier obtained for elementary abelian p-groups. To do this, we replace the analogue of 1-parameter subgroups by a refined version of equivalence classes of π-points for kτ. More generally, we provide a construction of vector bundles for the semi-direct product G τ of an infinitesimal group scheme G and a finite group τ. A major motivation for this study is to further our understanding of the relationship between representations of G( Fp) and G(r) associated to a finite dimensional rational G-module M, where G is a reductive group with r-th Fobenius kernel G(r). Using vector bundles, we extend and sharpen earlier results comparing support varieties.