Super-approximation, II: the p-adic and bounded power of square-free integers cases

Abstract

Let be a finite symmetric subset of GLn(Z[1/q0]), and := . Then the family of Cayley graphs \ Cay(πm(),πm())\m is a family of expanders as m ranges over fixed powers of square-free integers and powers of primes that are coprime to q0 if and only if the connected component of the Zariski-closure of is perfect. Some of the immediate applications, e.g. orbit equivalence rigidity, largeness of certain -adic Galois representations, are also discussed.