Locally induced Galois representations with exceptional residual images

Abstract

In this paper, we classify all continuous Galois representations :Gal(Q/Q) GL2(Qp) which are unramified outside \p,∞\ and locally induced at p, under the assumption that is exceptional, that is, has image of order prime to p. We prove two results. If f is a level one cuspidal eigenform and one of the p-adic Galois representations f associated to f has exceptional residual image, then f is not locally induced and ap(f)≠ 0. If is locally induced at p and with exceptional residual image, and furthermore certain subfields of the fixed field of the kernel of are assumed to have class numbers prime to p, then has finite image up to a twist.

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