Uniform boundedness of small points on abelian varieties over function fields

Abstract

Let k be a field of characteristic 0 and let K = k(B) be the function field of a geometrically irreducible projective curve B over k. Let A/K be a g-dimensional abelian variety with TrK/k(A) = 0. We prove that any K-rational torsion point x of A has order uniformly bounded in terms of g and the gonality of B. We also prove a uniform lower bound on the N\'eron-Tate height hA,L(x) in terms of the stable Faltings height hFal(A) for any K-rational point x whose forward orbit is Zariski dense, proving the Lang-Silverman conjecture over function fields of characteristic 0.

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