Remarks on a theorem of Silverman

Abstract

Motivated by a theorem of Silverman, we consider the following problem. Let A be an abelian variety over a global field K. Given a non-torsion point P ∈ A(K), for a sufficiently large positive integer n, whether there exists a place v of K such that the order of the reduction of P modulo v is n? In this article, we first show that this holds for an elliptic curve over a global function field of positive characteristic p>3 and for sufficiently large positive integers n coprime to p. In the second part of the paper, we consider its relative version over C. More precisely, let π: A → S be an abelian scheme over some variety S over C, and let P be a non-torsion section of π. If the Betti map associated to P is generically submersive, then for every sufficiently large n, there is a point s in S( C) such that P(s) is a point of order n in the corresponding fiber.

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