Analytic rank-one elliptic curves over function fields and their rank over certain ring class fields
Abstract
Let E/k be a non-isotrivial elliptic curve over a global function field k of characteristic p>3, and G⊂ Gal(ksep/k) be a topologically finitely generated subgroup. We prove that if E/k has analytic rank 1, then its rank over the fixed subfield LG is infinite, where L is the infinite ring class extension of some finite separable extension K/k. If E/k has analytic rank 0, then we prove that the same holds provided there exists an imaginary quadratic extension K/k such that E/K has analytic rank 1 and satisfies the Heegner hypothesis.
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