Additive energy of cyclic matrix groups and character sums with matrix exponential functions

Abstract

We obtain a nontrivial bound on the number of solutions to the equation Ax1 + Ax2 = Ax3 + Ax4, 1 x1,x2,x3,x4 τ, with a fixed n× n matrix A over a finite field Fq of q elements of multiplicative order τ. For n=2 this equation has been considered by Kurlberg and Rudnick (2001) in their study of quantum ergodicity for linear maps over Fq. Furthermore, its multivariate analogue (also with n=2) has been studied by Bourgain (2005). We give applications of our result to obtaining a new bound of additive character sums with a matrix exponential function, which is nontrivial beyond the square-root threshold, and also to a certain additive problem with matrices. Our results are especially strong for SL(n,q) matrices with an irreducible characteristic polynomial.