Estimates for the number of rational points on simple abelian varieties over finite fields

Abstract

Let A be a simple abelian variety of dimension g over the field Fq. The paper provides improvements on the Weil estimates for the size of A(Fq). For an arbitrary value of q we prove ((q-1)2 + 1)g ≤slant A(Fq) ≤slant ((q+1)2 - 1)g holds with finitely many exceptions. We compute improved bounds for various small values of q. For instance, the Weil bounds for q=3,4 give a trivial estimate A(Fq) ≥slant 1; we prove A(F3) ≥slant 1.359g and A(F4) ≥slant 2.275g hold with finitely many exceptions. We use these results to describe all abelian varieties over finite fields that have no new points in some finite field extension.