Towards super-approximation in positive characteristic

Abstract

In this note we show that the family of Cayley graphs of a finitely generated subgroup of GLn0(Fp(t)) modulo some admissible square-free polynomials is a family of expanders under certain algebraic conditions. Here is a more precise formulation of our main result. For a positive integer c0, we say a square-free polynomial is c0-admissible if degree of irreducible factors of f are distinct integers with prime factors at least c0. Suppose is a finite symmetric subset of GLn0(Fp(t)), where p is a prime more than 5. Let be the group generated by . Suppose the Zariski-closure of is connected, simply-connected, and absolutely almost simple; further assume that the field generated by the traces of Ad() is Fp(t). Then for some positive integer c0 the family of Cayley graphs Cay(πf(x)(),πf(x)()) as f ranges in the set of c0-admissible polynomials is a family of expanders, where πf(t) is the quotient map for the congruence modulo f(t).