A rank zero p-converse to a theorem of Gross--Zagier, Kolyvagin and Rubin
Abstract
Let E be a CM elliptic curve defined over Q and p a prime. We show that corankZp Selp∞(E/Q)=0 ords=1L(s,E/Q)=0 for the p∞-Selmer group Selp∞(E/Q) and the complex L-function L(s,E/Q). Along with Smith's work on the distribution of 2∞-Selmer groups, this leads to the first instance of the even parity Goldfeld conjecture: For 50\% of the positive square-free integers n, we have ords=1L(s,E(n)/Q)=0, where E(n): ny2=x3-x is a quadratic twist of the congruent number elliptic curve E: y2=x3-x.
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