Regulator constants and the parity conjecture
Abstract
The p-parity conjecture for twists of elliptic curves relates multiplicities of Artin representations in p-infinity Selmer groups to root numbers. In this paper we prove this conjecture for a class of such twists. For example, if E/Q is semistable at 2 and 3, K/Q is abelian and K^\infty is its maximal pro-p extension, then the p-parity conjecture holds for twists of E by all orthogonal Artin representations of Gal(K^\infty/Q). We also give analogous results when K/Q is non-abelian, the base field is not Q and E is replaced by an abelian variety. The heart of the paper is a study of relations between permutation representations of finite groups, their "regulator constants", and compatibility between local root numbers and local Tamagawa numbers of abelian varieties in such relations.
Cite
@article{arxiv.0709.2852,
title = {Regulator constants and the parity conjecture},
author = {Tim Dokchitser and Vladimir Dokchitser},
journal= {arXiv preprint arXiv:0709.2852},
year = {2013}
}
Comments
50 pages; minor corrections; final version, to appear in Invent. Math