A Family of Elliptic Curves with a Lower Bound on 2-Selmer Ranks of Quadratic Twists
Abstract
For any number field K with a complex place, we present an infinite family of elliptic curves defined over K such that dim F2 Sel2(EF/K) dim F2 EF(K)[2] + r2 for every quadratic twist EF of every curve E in this family, where r2 is the number of complex places of K. This provides a counterexample to a conjecture appearing in work of Mazur and Rubin.
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