On p-filtrations of Weyl modules

Abstract

This paper considers Weyl modules for a simple, simply connected algebraic group over an algebraically closed field k of positive characteristic p=2. The main result proves, if p≥ 2h-2 (where h is the Coxeter number) and if the Lusztig character formula holds for all (irreducible modules with) regular restricted highest weights, then any Weyl module (λ) has a p-filtration, namely, a filtration with sections of the form p(μ0+pμ1):=L(μ0)(μ1)[1], where μ0 is restricted and μ1 is arbitrary dominant. In case the highest weight λ of the Weyl module (λ) is p-regular, the p-filtration is compatible with the G1-radical series of the module. The problem of showing that Weyl modules have p-filtrations was first proposed as a worthwhile ("w\"unschenswert") problem in Jantzen's 1980 Crelle paper.