Factorization of measures and applications to the weak Goldfeld conjecture

Abstract

Extending Gross's result, we prove that a certain factorizaton of measures holds for all p and any finite even Dirichlet character of any conductor, rather than only for split p and with conductor a power of p. Using this generalization, we find lower bounds on the proportion of imaginary quadratic fields K for which (under certain assumptions on the elliptic curve) a chosen quadratic twist of an elliptic curve E over K has rank 1. We also find lower and upper bounds for the proportion of quadratic twists with rank 1 when we vary D, the factor we twist by, under the assumption that ω (the prime factor counting function) is sufficiently close to a Gaussian distribution, as described by Erd\"os-Kac. We apply similar methods to cubic twists, and then derive analogous lower bounds for the proportion of imaginary quadratic fields for which a sextic twist has rank 1. Lastly, for elliptic curves over Q satisfying certain assumptions, we find positive lower bounds on the proportion of quadratic twists (over Q) which have rank 0 and rank 1, which yields examples of elliptic curves satisfying the weak Goldfeld conjecture.