On sl2-triples for classical algebraic groups in positive characteristic

Abstract

Let k be an algebraically closed field of characteristic p > 2, let n ∈ Z>0, and take G to be one of the classical algebraic groups GLn(k), SLn(k), Spn(k), On(k) or SOn(k), with g = Lie G. We determine the maximal G-stable closed subvariety V of the nilpotent cone N of g such that the G-orbits in V are in bijection with the G-orbits of sl2-triples (e,h,f) with e,f ∈ V. This result determines to what extent the theorems of Jacobson--Morozov and Kostant on sl2-triples hold for classical algebraic groups over an algebraically closed field of "small" odd characteristic.