Singular Gauss sums, Polya-Vinogradov inequality for GL(2) and growth of primitive elements

Abstract

We establish an analogue of the classical Polya-Vinogradov inequality for GL(2, p), where p is a prime. In the process, we compute the `singular' Gauss sums for GL(2, p). As an application, we show that the collection of elements in GL(2,) whose reduction modulo p are of maximal order in GL(2, p) and whose matrix entries are bounded by x has the expected size as soon as x p1/2+ for any >0. In particular, there exist elements in GL(2,) with matrix entries that are of the order O(p1/2+) whose reduction modulo p are primitive elements.