On the distribution of the number of points on a family of curves over finite fields

Abstract

Let p be a large prime, ≥ 2 be a positive integer, m≥ 2 be an integer relatively prime to and P(x)∈Fp[x] be a polynomial which is not a complete '-th power for any ' for which GCD(',)=1. Let C be the curve defined by the equation y=P(x), and take the points on C to lie in the rectangle [0,p-1]2. In this paper, we study the distribution of the number of points on C inside a small rectangle among residue classes modulo m when we move the rectangle around in [0,p-1]2.