Growth in Chevalley groups relatively to parabolic subgroups and some applications

Abstract

Given a Chevalley group G(q) and a parabolic subgroup P⊂ G(q), we prove that for any set A there is a certain growth of A relatively to P, namely, either AP or PA is much larger than A. Also, we study a question about intersection of An with parabolic subgroups P for large n. We apply our method to obtain some results on a modular form of Zaremba's conjecture from the theory of continued fractions and make the first step towards Hensley's conjecture about some Cantor sets with Hausdorff dimension greater than 1/2.