On the derived algebra of a centraliser

Abstract

Let be a classical Lie algebra, e a nilpotent of element and ge the centraliser of e in . We prove that e=[e,e] if and only if e is rigid. It is also shown that if e is contained in [e,e], then the nilpotent radical of e coincides with [(1)e,e], where (1)e is an eigenspace of a characteristic of e with the eigenvalue 1.