A local sign decomposition for symplectic self-dual Galois representations of rank two

Abstract

We prove the existence of a new structure on the first Galois cohomology of generic families of symplectic self-dual p-adic representations of GQp of rank two (a local sign decomposition): a functorial decomposition into free rank one Lagrangian submodules which encodes the p-adic variation of Bloch--Kato subgroups via completed epsilon constants, mirroring a symplectic structure. The local sign decomposition has diverse local as well as global arithmetic consequences. This includes compatibility of the Mazur--Rubin arithmetic local constant and completed epsilon constants, answering a question of Mazur and Rubin. The compatibility leads to new cases of the p-parity conjecture for Hilbert modular forms at supercuspidal primes p. We also formulate and prove an analogue of Rubin's conjecture over ramified quadratic extensions of Qp. Using it, we construct an integral p-adic L-function for anticyclotomic deformation of a CM elliptic curve at primes p ramified in the CM field.