Spin representations of real reflection groups of non-crystallographic root systems

Abstract

A uniform parametrization for the irreducible spin representations of Weyl groups in terms of nilpotent orbits is recently achieved by Ciubotaru (2011). This paper is a generalization of this result to other real reflection groups. Let (V0, R, V0, R) be a root system with the real reflection group W. We define a special subset of points in V0 which will be called solvable points. Those solvable points, in the case R crystallographic, correspond to the nilpotent orbits whose elements have a solvable centralizer in the corresponding Lie algebra. Then a connection between the irreducible spin representations of W and those solvable points in V0 is established.