Mixed Commuting Varieties over simple Lie algebras

Abstract

Let g be a simple Lie algebra defined over an algebraically closed field k of characteristic p. Fix an integer r>1 and suppose that V1,…,Vr are irreducible closed subvarieties of g. Let C(V1,…,Vr) be the closed variety of all the pairwise commuting elements in V1×·s× Vr. This paper studies the dimension and irreducibility of such varieties with various Vi in a Lie algebra g. In particular, we complete the problem for the case when Vi's are either Osub the closure of the subregular orbit or N the nilpotent cone of any rank two Lie algebra g. A result on the dimension of these mixed commuting varieties is generalized for higher ranks. Finally, we apply our calculations to study properties of support varieties for a simple module over the r-th Frobenius kernels of G.