Abelian surfaces over Fq(t) with large Tate-Shafarevich groups
Abstract
We produce an explicit sequence (Sa )a ≥ 1 of abelian surfaces over the rational function field Fq(t) whose Tate-Shafarevich groups are finite and large. More precisely, we establish the estimate (Sa) = H(Sa)1 + o(1) as a → ∞, where H(Sa) denotes the exponential height of Sa. Our method is to prove that each Sa satisfies the BSD conjecture, analyse the geometry and arithmetic of its N\'eron model and give an explicit expression for its L-function in terms of Gauss and Kloosterman sums. By studying the relative distribution of the angles associated to these character sums, we estimate the size of the central value of L(Sa, T), hence the order of III(Sa).
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