Kostant's problem and parabolic subgroups

Abstract

Let g be a finite dimensional complex semi-simple Lie algebra with Weyl group W and simple reflections S. For I⊂eq S let gI be the corresponding semi-simple subalgebra of g. Denote by WI the Weyl group of gI and let wo and wIo be the longest elements of W and WI, respectively. In this paper we show that the answer to Kostant's problem, i.e. whether the universal enveloping algebra surjects onto the space of all ad-finite linear transformations of a given module, is the same for the simple highest weight gI-module LI(x) of highest weight x· 0, x∈ WI, as the answer for the simple highest weight g-module L(x wIo wo) of highest weight (x wIo wo)· 0. We also give a new description of the unique quasi-simple quotient of the Verma module (e) with the same annihilator as L(y), y∈ W.