Character of Irreducible Representations Restricted to Finite Order Elements -- An Asymptotic Formula

Abstract

Let G be a connected reductive group over the complex numbers and let T⊂ G be a maximal torus. For any t∈ T of finite order and any irreducible representation V(λ) of G of highest weight λ, we determine the character ch(t, V(λ)) by using the Lefschetz Trace Formula due to Atiyah-Singer and explicitly determining the connected components and their normal bundles of the fixed point subvariety (G/P)t⊂ G/P (for any parabolic subgroup P). This together with Wirtinger's theorem gives an asymptotic formula for ch(t, V(nλ)) when n goes to infinity.

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