p-adic Waldspurger Formula for Non-split Primes and Converse of Gross--Zagier and Kolyvagin Theorem

Abstract

Let p be a prime and K be an imaginary quadratic field. In this paper we generalize a recent construction of a new type of p-adic L-function and p-adic Waldspurger formula by Andreatta-Iovita for p non-split in K, as long as the GL2 automorphic representation is principal series at p. Then we develop a new kind of anticyclotomic local -Iwasawa theory at p for self-dual Hecke characters over imaginary quadratic fields (including elliptic curves E/Q with complex multiplication) which is valid for all ramification types of p (split, inert and ramified, and allowing p=2). As the main consequence, we prove the converse of the Gross--Zagier--Kolyvagin theorem for self-dual CM characters: if the Selmer rank of is 1, then the analytic rank of L(,s) at s=1 is also 1. As corollaries, we prove Sylvester's conjecture (1879) on sums of two rational cubes, and Goldfeld's conjecture for CM elliptic curves over Q (conditional on work of A. Smith).