Invariants for G(r)-modules

Abstract

We revisit the constructions given by J. Pevtsova and the author of refined invariants for finite dimensional representations of infinitesimal group schemes G(r) over a field k of characteristic p>0. Our focus is on the universal p-nilpotent operator seen as an element in the group algebra of the group scheme G(r),X over X, where X is either the moduli space Vr( G) of height r 1-parameter subgroups of G or the moduli space Cr( Np( g)) of r-tuples of p-nilpotent, pair-wise commuting elements of the Lie algebra of G. We formalize Jordan type function using several variants of the continuous function JT G,r,M(-): P Vr( G) Y where Y is the poset of Young diagrams with p-columns. One of these variants is designed to be more conducive to computation. The vector bundle construction given by J. Pevtsova and the author is extended to all finite dimensional G(r)-modules, producing coherent sheaves on X which are locally free on the strata of X associated to JT G,r,M(-).