The symmetric invariants of the centralizers and Slodowy grading

Abstract

Let g be a finite-dimensional simple Lie algebra of rank r over an algebraically closed field of characteristic zero, and let e be a nilpotent element of g. Denote by ge the centralizer of e in g and by S(ge)ge the algebra of symmetric invariants of ge. We say that e is good if the nullvariety of some r homogeneous elements of S(ge)ge in the dual of ge has codimension r. If e is good then S(ge)ge is polynomial. The main result of this paper stipulates that if for some homogeneous generators of S(ge)ge, the initial homogeneous component of their restrictions to e+gf are algebraically independent, with (e,h,f) an sl2-triple of g, then e is good. As applications, we obtain new examples of nilpotent elements that verify the above polynomiality condition, in in simple Lie algebras of both classical and exceptional types. We also give a counter-example in type D7.