A p-Converse theorem for Real Quadratic Fields
Abstract
Let E be an elliptic curve defined over a real quadratic field F. Let p > 5 be a rational prime that is inert in F and assume that E has split multiplicative reduction at the prime p of F dividing p. Let III(E/F) denote the Tate-Shafarevich group of E over F and L(E/F,s) be the Hasse-Weil complex L-function of E over F. Under some technical assumptions, we show that when rankZ 0.01mm 1mm E(F) = 1 and \#(III(E/F) p∞) < ∞, then ords=1 \ L(E/F,s) = 1. Further, we give an application to a p-converse theorem over Q.
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