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9 - Equations différentielles p-adiques et modules de Jacquet analytiques

Published online by Cambridge University Press:  05 October 2014

Gabriel Dospinescu
Affiliation:
UMR, Ecole Normale Supérieure de Lyon
Fred Diamond
Affiliation:
King's College London
Payman L. Kassaei
Affiliation:
King's College London
Minhyong Kim
Affiliation:
University of Oxford
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Publisher: Cambridge University Press
Print publication year: 2014

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References

[1] L., Berger-Représentations p-adiques et équations différentielles, Invent. Math. 148 (2002), 219–284.Google Scholar
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[8] G., Dospinescu-Actions infinitésimales dans la correspondance de Langlands locale p-adique, Math. Ann. 354 (2012), 627–657.Google Scholar
[9] M., Emerton-Locally analytic vectors in representations of locally p-adic analytic groups, to appear in Memoirs of the AMS.
[10] M., Emerton-A local-global compatibility conjecture in the p-adic Langlands programme for GL2/Q, Pure Appl. Math. Q. 2 (2006), 279–393.Google Scholar
[11] J.-M., Fontaine-Représentations p-adiques des corps locaux. I, in The Grothendieck Festschrift, Vol II, Progr. Math., vol 87, Birkhauser, 1990, 249–309.
[12] K.S., Kedlaya-A p-adic local monodromy theorem, Ann. of Math. 160 (2004), 93–184.Google Scholar
[13] R., Liu, Locally analytic vectors of some crystabeline representations of GL2(Qp), Compositio Mathematica, Volume 148, Issue 01, (2012) 28–64.Google Scholar
[14] R., Liu, B., Xie, Y., Zhang, Locally analytic vectors of unitary principal series of GL2(Qp), Annales Scientifiques de l'E.N.S. Vol. 45, No. 1, (2012) 167–190.Google Scholar
[15] P., Schneider et J., Teitelbaum- Locally analytic distributions and p-adic representation theory, with applications to GL2, J. Amer. Math. Soc 15 (2002), 443–468.Google Scholar
[16] P., Schneider et J., Teitelbaum- Algebras of p-adic distributions and admissible representations, Invent. Math. 153 (2003), 145–196.Google Scholar
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