Kobayashi length bounds on bordered surfaces and generalized integral points on abelian varieties
Abstract
Let B be a compact Riemann surface and B0⊂ B a bordered hyperbolic subsurface obtained by removing finitely many disjoint closed disks. Fix a nontrivial loop α in B0. For s 0, let L(α,s) denote the supremum, over all finite subsets S⊂ B0 with \#S s, of the minimal Kobayashi length of a loop in B0 S that is freely homotopic to α in B0. Phung in [7] proved that L(α,s) grows at most linearly and at least as s/ s. We sharpen the upper bound to O(s s), which determines s∞ L(α,s) s=12, answering a question raised in [7, Question 1.4]. As an application, we improve the counting bound for generalized integral points on abelian varieties over complex function fields: for an abelian variety of dimension n over C(B), Phung proved that the number of (s, B0)-generalized integral points modulo the constant trace grows at most as s2nk, where k=rk(π1(B0)). We sharpen this to snk+ for every >0, halving the exponent.
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