Stabilisers of eigenvectors of finite reflection groups

Abstract

Let x be an eigenvector for an element of a finite irreducible reflection group W. Let Wx denote the subgroup of W which stabilises x. We provide an upper bound for the number of roots in the root system of Wx . This generalises a result of Kostant, who showed that every eigenvector with eigenvalue a primitive hth root of unity is regular, where h is the Coxeter number of W. We also give a Lie-theoretic interpretation of our result in the study of semisimple conjugacy classes over Laurent series. In a forthcoming paper, we use this result to establish a geometric analogue of a conjecture of Gross and Reeder.