Kleinian Schottky groups, Patterson-Sullivan measures and Fourier decay

Abstract

Let be a Zariski dense Kleinian Schottky subgroup of PSL2(C). Let () be its limit set, endowed with a Patterson-Sullivan measure μ supported on (). We show that the Fourier transform μ() enjoys polynomial decay as goes to infinity. This is a PSL2(C) version of the result of Bourgain-Dyatlov [8], and uses the decay of exponential sums based on Bourgain-Gamburd sum-product estimate on C. These bounds on exponential sums require a delicate non-concentration hypothesis which is proved using some representation theory and regularity estimates for stationary measures of certain random walks on linear groups.