Heights and the Specialization Map for Families of Elliptic Curves over Pn

Abstract

For n≥ 2, let K=Q(Pn)=Q(T1, …, Tn). Let E/K be the elliptic curve defined by a minimal Weiestrass equation y2=x3+Ax+B, with A,B ∈ Q[T1, …, Tn]. There's a canonical height hE on E(K) induced by the divisor (O), where O is the zero element of E(K). On the other hand, for each smooth hypersurface in Pn such that the reduction mod of E, E / Q() is an elliptic curve with the zero element O, there is also a canonical height hE on E(Q()) that is induced by (O). We prove that for any P ∈ E(K), the equality hE(P)/ =hE(P) holds for almost all hypersurfaces in Pn. As a consequence, we show that for infinitely many t ∈ Pn(Q), the specialization map σt : E(K) → Et(Q) is injective.