Super-approximation, I: p-adic semisimple case

Abstract

Let k be a number field, be a finite symmetric subset of GLn0(k), and = . Let \[ C():=\p∈ Vf(k)|1mm is a bounded subgroup of GLn0(kp)\, \] and p be the closure of in GLn0(kp). Assuming that the Zariski-closure of is semisimple, we prove that the family of left translation actions \ p\p∈ C() has uniform spectral gap. As a corollary we get that the left translation action G has local spectral gap if is a countable dense subgroup of a semisimple p-adic analytic group G and Ad() consists of matrices with algebraic entries in some Qp-basis of Lie(G). This can be viewed as a (stronger) p-adic version of [Theorem A]BISG, which enables us to give applications to the Banach-Ruziewicz problem and orbit equivalence rigidity.