Geometric generalizations of the square sieve, with an application to cyclic covers

Abstract

We formulate a general problem: given projective schemes Y and X over a global field K and a K-morphism η from Y to X of finite degree, how many points in X(K) of height at most B have a pre-image under η in Y(K)? This problem is inspired by a well-known conjecture of Serre on quantitative upper bounds for the number of points of bounded height on an irreducible projective variety defined over a number field. We give a non-trivial answer to the general problem when K=Fq(T) and Y is a prime degree cyclic cover of X=PKn. Our tool is a new geometric sieve, which generalizes the polynomial sieve to a geometric setting over global function fields.