R=T theorems for weight one modular forms

Abstract

We prove modularity of certain residually reducible ordinary 2-dimensional p-adic Galois representations with determinant a finite order odd character . For certain non-quadratic we prove an R=T result for T the weight 1 specialisation of the Hida Hecke algebra acting on non-classical weight 1 forms, under the assumption that no two Hida families congruent to an Eisenstein series cross in weight 1. For quadratic we prove that the quotient of R corresponding to deformations split at p is isomorphic to the Hecke algebra acting on classical CM weight 1 modular forms.