On the p-converse of the Kolyvagin-Gross-Zagier theorem
Abstract
Let A/Q be an elliptic curve having split multiplicative reduction at an odd prime p. Under some mild technical assumptions, we prove the statement: rankZA(Q)=1 \ \ and\ \ \ \#(III(A/Q)[p∞])<∞\ \ \ \ ords=1L(A/Q,s)=1, thus providing a "p-converse" to a celebrated theorem of Kolyvagin-Gross-Zagier.
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