Lower bounds on the maximal number of rational points on curves over finite fields

Abstract

For a given genus g ≥ 1, we give lower bounds for the maximal number of rational points on a smooth projective absolutely irreducible curve of genus g over Fq. As a consequence of Katz-Sarnak theory, we first get for any given g>0, any >0 and all q large enough, the existence of a curve of genus g over Fq with at least 1+q+ (2g-) q rational points. Then using sums of powers of traces of Frobenius of hyperelliptic curves, we get a lower bound of the form 1+q+1.71 q valid for g ≥ 3 and odd q ≥ 11. Finally, explicit constructions of towers of curves improve this result, with a bound of the form 1+q+4 q -32 valid for all g 2 and for all q.