Relative deformation theory, relative Selmer groups, and lifting irreducible Galois representations
Abstract
We study irreducible odd mod p Galois representations Gal(F/F) G(Fp), for F a totally real number field and G a general reductive group. For p G, F 0, we show that any that lifts locally, and at places above p to de Rham and Hodge-Tate regular representations, has a geometric p-adic lift. We also prove non-geometric lifting results without any oddness assumption.
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