On 1-dimensional representations of finite W-algebras associated to simple Lie algebras of exceptional type

Abstract

We consider the finite W-algebra U(,e) associated to a nilpotent element e ∈ in a simple complex Lie algebra of exceptional type. Using presentations obtained through an algorithm based on the PBW-theorem, we verify a conjecture of Premet, that U(,e) always has a 1-dimensional representation, when is of type G2, F4, E6 or E7. Thanks to a theorem of Premet, this allows one to deduce the existence of minimal dimension representations of reduced enveloping algebras of modular Lie algebras of the above types. In addition, a theorem of Losev allows us to deduce that there exists a completely prime primitive ideal in U() whose associated variety is the coadjoint orbit corresponding to e.