The Structure of the Group of Rational Points of an Abelian Variety over a Finite Field

Abstract

Let A be a simple abelian variety of dimension g defined over a finite field Fq with Frobenius endomorphism π. This paper describes the structure of the group of rational points A(Fqn), for all n ≥ 1, as a module over the ring R of endomorphisms which are defined over Fq, under certain technical conditions. If [Q(π) : Q]=2g and R is a Gorenstein ring, then A(Fqn) R/R(πn-1). This includes the case when A is ordinary and has maximal real multiplication. Otherwise, if Z is the center of R and (πn - 1)Z is the product of invertible prime ideals in Z, then A(Fqn)d R/R(πn - 1) where d = 2g/[Q(π):Q]. Finally, we deduce the structure of A(Fq) as a module over R under similar conditions. These results generalize results of Lenstra for elliptic curves.