Minimal dimensional representations of reduced enveloping algebras for gln

Abstract

Let g = glN(k), where k is an algebraically closed field of characteristic p > 0, and N ∈ Z 1. Let ∈ g* and denote by U( g) the corresponding reduced enveloping algebra. The Kac--Weisfeiler conjecture, which was proved by Premet, asserts that any finite dimensional U( g)-module has dimension divisible by pd, where d is half the dimension of the coadjoint orbit of . Our main theorem gives a classification of U( g)-modules of dimension pd. As a consequence, we deduce that they are all parabolically induced from a 1-dimensional module for U0( h) for a certain Levi subalgebra h of g; we view this as a modular analogue of Mglin's theorem on completely primitive ideals in U(glN( C)). To obtain these results, we reduce to the case is nilpotent, and then classify the 1-dimensional modules for the corresponding restricted W-algebra.