On lifting and modularity of reducible residual Galois representations over imaginary quadratic fields

Abstract

In this paper we study deformations of mod p Galois representations τ (over an imaginary quadratic field F) of dimension 2 whose semi-simplification is the direct sum of two characters τ1 and τ2. As opposed to our previous work we do not impose any restrictions on the dimension of the crystalline Selmer group H1(F, Hom(τ2, τ1)) ⊂ Ext1(τ2, τ1). We establish that there exists a basis B of H1(F, Hom(τ2, τ1)) arising from automorphic representations over F (Theorem 8.1). Assuming among other things that the elements of B admit only finitely many crystalline characteristic 0 deformations we prove a modularity lifting theorem asserting that if τ itself is modular then so is its every crystalline characteristic zero deformation (Theorems 8.2 and 8.5).