Equidistribution of polynomial sequences in function fields: resolution of a conjecture

Abstract

Let Fq be the finite field of q elements having characteristic p, and denote by K∞= Fq((1/t)) the field of formal Laurent series in 1/t. We consider the equidistribution in T= K∞/ Fq[t] of the values of polynomials f(u)∈ K∞ [u] as u varies over Fq[t]. Let K be a finite set of positive integers, and suppose that αr∈ K∞ for r∈ K \0\. We show that the polynomial Σr∈ K\0\αrur is equidistributed in T whenever αk is irrational for some k∈ K satisfying p k, and also pvk∈ K for any positive integer v. This conclusion resolves in full a conjecture made jointly by the third, fourth and fifth authors.