A Lehmer-type height lower bound for abelian surfaces over function fields

Abstract

Let K be a 1-dimensional function field over an algebraically closed field of characteristic 0, and let A/K be an abelian surface. Under mild assumptions, we prove a Lehmer-type lower bound for points in A(K). More precisely, we prove that there are constants C1,C2>0 such that the normalized Bernoulli-part of the canonical height is bounded below by hAB(P) C1[K(P):K]-2 for all points P∈A(K) whose height satisfies 0<hA(P)C2.