Spinorial Representations of Orthogonal Groups

Abstract

Let G be a real compact Lie group, such that G=G0 C2, with G0 simple. Here G0 is the connected component of G containing the identity and C2 is the cyclic group of order 2. We give a criterion for whether an orthogonal representation π: G O(V) lifts to Pin(V) in terms of the highest weights of π. We also calculate the first and second Stiefel-Whitney classes of the representations of the Orthogonal groups.