Thomas Barnet-Lamb, Toby Gee, David Geraghty
Published 2010-06-02Version 1
Under mild hypotheses, we prove that if F is a totally real field, k is the algebraic closure of the finite field with l elements and r : G_F --> GL_2(k) is irreducible and modular, then there is a finite solvable totally real extension F'/F such that r|_{G_F'} has a modular lift which is ordinary at each place dividing l. We deduce a similar result for r itself, under the assumption that at places v|l the representation r|_{G_F_v} is reducible. This allows us to deduce improvements to results in the literature on modularity lifting theorems for potentially Barsotti-Tate representations and the Buzzard-Diamond-Jarvis conjecture. The proof makes use of a novel lifting technique, going via rank 4 unitary groups.
Congruences involving $\binom{2k}k^2\binom{3k}km^{-k}$
Proof of some congruences conjectured by Guo and Liu
Identities and congruences for a new sequence
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