Probabilistic Waring problems for finite simple groups

Abstract

The probabilistic Waring problem for finite simple groups asks whether every word of the form w1w2, where w1 and w2 are non-trivial words in disjoint sets of variables, induces almost uniform distribution on finite simple groups with respect to the L1 norm. Our first main result provides a positive solution to this problem. We also provide a geometric characterization of words inducing almost uniform distribution on finite simple groups of Lie type of bounded rank, and study related random walks. Our second main result concerns the probabilistic L∞ Waring problem for finite simple groups. We show that for every l 1 there exists N = N(l), such that if w1, … , wN are non-trivial words of length at most l in pairwise disjoint sets of variables, then their product w1 ·s wN is almost uniform on finite simple groups with respect to the L∞ norm. The dependence of N on l is genuine. This result implies that, for every word w = w1 ·s wN as above, the word map induced by w on a semisimple algebraic group over an arbitrary field is a flat morphism. Applications to representation varieties, subgroup growth, and random generation are also presented.