Perfect points of abelian varieties

Abstract

Let k be an algebraic extension of Fp and K/k a regular extension of fields (e.g. Fp(T)/ Fp). Let A be a K-abelian variety such that all the isogeny factors are neither isotrivial nor of p-rank zero. We give a necessary and sufficient condition for the finite generation of A(Kperf) in terms of the action of End(A) Qp on the p-divisible group A[p∞] of A. In particular we prove that if End(A) Qp is a division algebra then A(Kperf) is finitely generated. This implies the "full" Mordell-Lang conjecture for these abelian varieties. In addition we prove that all the infinitely p-divisible elements in A(Kperf) are torsion. These reprove and extend previous results to the non ordinary case. One of the main technical intermediate result is an overconvergence theorem for the Dieudonn\'e module of certain semiabelian schemes over smooth varieties.