On the nullcone and the variety g of a semisimple lie algebra

Abstract

Let g be a semisimple Lie algebra of finite dimension. The nullcone N of g is the set of (x, y) in g×g such that x and y are nilpotents and are in the same Borel subalgebra. The main result of this paper is that N is a closed and irreducible subvariety of g × g whose normalization has rational singularities and such that the normalization morphism is bijective.