Exceptional representations of simple algebraic groups in prime characteristic

Abstract

Let G be a simply connected simple algebraic group over an algebraically closed field K of characteristic p>0 with root system R, and let g= L(G) be its restricted Lie algebra. Let V be a finite dimensional g-module over K. For any point v∈V, the isotropy subalgebra of v in g is gv=\x∈ g/x· v=0\. A restricted g-module V is called exceptional if for each v∈ V the isotropy subalgebra gv contains a non-central element (that is, gv⊂eq z( g)). This work is devoted to classifying irreducible exceptional g-modules. A necessary condition for a g-module to be exceptional is found and a complete classification of modules over groups of exceptional type is obtained. For modules over groups of classical type, the general problem is reduced to a short list of unclassified modules. The classification of exceptional modules is expected to have applications in modular invariant theory and in classifying modular simple Lie superalgebras.