Closed Orbits and Descents for Enhanced Standard Representations of Classical Groups

Abstract

Let G=GLn(F), On(F), or Sp2n(F) be one of the classical groups over an algebraically closed field F of characteristic 0, let G be the MVW-extension of G, and let g be the Lie algebra of G. In this paper, we classify the closed orbits in the enhanced standard representation g× E of G, where E is the natural representation if G=On(F) or Sp2n(F), and is the direct sum of the natural representation and its dual if G=GLn(F). Additionally, for every closed G-orbit in g× E, we prove that it is G-stable, and determine explicitly the corresponding stabilizer group as well as the action on the normal space.