Potential automorphy over CM fields
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Peer-reviewed
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Abstract
Let F be a CM number field. We prove modularity lifting theorems for regular n-dimensional Galois representations over F without any self- duality condition. We deduce that all elliptic curves E over F are poten- tially modular, and furthermore satisfy the Sato–Tate conjecture. As an application of a different sort, we also prove the Ramanujan Conjecture for weight zero cuspidal automorphic representations for GL2(AF ).
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Keywords
Galois representations, automorphic forms
Journal Title
Annals of Mathematics
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0003-486X
1939-8980
1939-8980
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Annals of Mathematics
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European Research Council (714405)
P.A. was supported in part by Simons Foundation Collaboration Grant for Mathemati- cians 527275, NSF Grant DMS-1902155, and by NSERC.
F.C. was supported in part by NSF Grants DMS-1701703 and DMS-2001097.
A.C. was supported in part by NSF Grant DMS-1501064, by a Royal Society University Research Fellowship, by ERC Starting Grant 804176 and by a Leverhulme Prize.
T.G. was supported in part by a Leverhulme Prize, EPSRC grant EP/L025485/1, ERC Starting Grant 306326, and a Royal Society Wolfson Research Merit Award.
B.L. was supported in part by NSF Grant DMS-1802037, NSF Grant DMS-1952678 and the Alfred P. Sloan Foundation.
J.N. was supported by a UKRI Future Leaders Fellowship, grant MR/V021931/1.
P.S. was supported in part by a DFG Leibniz Grant, and by the DFG under the Excellence Strategy EXC-2047/1-390685813.
R.T. was supported by NSF Grant DMS-1902265 during the revision of this paper. J.T. was supported by a Clay Research Fellowship and ERC Starting Grant 714405.