On the distribution of random words in a compact Lie group

Abstract

Let G be a compact Lie group. Suppose g1, …, gk are chosen independently from the Haar measure on G. Let A = i ∈ [k] Ai, where, Ai := \gi\ \gi-1\. Let μA be the uniform measure over all words of length whose alphabets belong to A. We give probabilistic bounds on the nearness of a heat kernel smoothening of μA to a constant function on G in L2(G). We also give probabilistic bounds on the maximum distance of a point in G to the support of μA. Lastly, we show that these bounds cannot in general be significantly improved by analyzing the case when G is the n-dimensional torus. The question of a spectral gap of a natural Markov operator associated with A when G is SU2 was reiterated by Bourgain and Gamburd, being first raised by Lubotzky, Philips and Sarnak in 1987 and is still open. In the setting of SU2, our results can be viewed as addressing a quantitative version of a weak variant of this question.