Random Unitary Representations of Surface Groups II: The large n limit

Abstract

Let g be a closed surface of genus g≥ 2 and g denote the fundamental group of g. We establish a generalization of Voiculescu's theorem on the asymptotic *-freeness of Haar unitary matrices from free groups to g. We prove that for a random representation of g into SU(n), with law given by the volume form arising from the Atiyah-Bott-Goldman symplectic form on moduli space, the expected value of the trace of a fixed non-identity element of g is bounded as n∞. The proof involves an interplay between Dehn's work on the word problem in g and classical invariant theory.

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