Zev Klagsbrun, Barry Mazur, Karl Rubin
Published 2011-11-09, updated 2016-05-13Version 3
We study the parity of 2-Selmer ranks in the family of quadratic twists of an arbitrary elliptic curve E over an arbitrary number field K. We prove that the fraction of twists (of a given elliptic curve over a fixed number field) having even 2-Selmer rank exists as a stable limit over the family of twists, and we compute this fraction as an explicit product of local factors. We give an example of an elliptic curve E such that as K varies, these fractions are dense in [0, 1]. More generally, our results also apply to p-Selmer ranks of twists of 2-dimensional self-dual F_p-representations of the absolute Galois group of K by characters of order p.
Comments: This version corrects a typo in the published version. Just before the last displayed equation before Conjecture 7.12 (page 313 of the published version, page 23 of this manuscript), "...Sha(E/K) is finite" should be "...Sha(E^\chi/K) is finite". This typo does not affect anything else in the text
Journal: Annals of Math. 178 (2013) 287-320
A Markov model for Selmer ranks in families of twists
Relatively projective groups as absolute Galois groups
The Nonexistence of Certain Representations of the Absolute Galois Group of Quadratic Fields
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