On the distribution of the rational points on cyclic covers in the absence of roots of unity

Abstract

In this paper we study the number of rational points on curves in an ensemble of abelian covers of the projective line: Let be a prime, q a prime power and consider the ensemble Hg, of -cyclic covers of P1Fq of genus g. We assume that q 0,1 . If 2g+2-20 (-1) ord(q), then Hg, is empty. Otherwise, the number of rational points on a random curve in Hg, distributes as Σi=1q+1 Xi as g ∞, where X1,…, Xq+1 are i.i.d.\ random variables taking the values 0 and with probabilities -1 and 1, respectively. The novelty of our result is that it works in the absence of a primitive -th-root of unity, the presence of which was crucial in previous studies.