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Remarks on some locally ℚp-analytic representations of GL2(F) in the crystalline case

Published online by Cambridge University Press:  05 January 2012

By
Christophe Breuil
Edited by
John Coates ,
Minhyong Kim ,
Florian Pop ,
Mohamed Saïdi  and
Peter Schneider
Christophe Breuil
Affiliation:
C.N.R.S. et Université Paris-Sud
John Coates
Affiliation:
University of Cambridge
Minhyong Kim
Affiliation:
University College London
Florian Pop
Affiliation:
University of Pennsylvania
Mohamed Saïdi
Affiliation:
University of Exeter
Peter Schneider
Affiliation:
Universität Münster
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Information
Non-abelian Fundamental Groups and Iwasawa Theory , pp. 212 - 238
Publisher: Cambridge University Press
Print publication year: 2011

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References

[1] Berger, L., Breuil, C., Sur quelques représentations potentiellement cristallines de GL2(√p), Astérisque 330, 2010, 155–211.Google Scholar
[2] Breuil, C., Emerton, M., Représentations p-adiques ordinaires de GL2(ℚp) et compatibilité local-global, Astérisque 331, 2010, 255–315.Google Scholar
[3] Breuil, C., Pašskūnas, V., Towards a modulo p Langlands correspondence for GL2, Memoirs of A.M.S., published online 23 May 2011.
[4] Carayol, H., Sur les représentations l-adiques associées aux formes modulaires de Hilbert, Ann. Scient. E.N.S. 19, 1986, 409–468.Google Scholar
[5] Calegari, F., Emerton, M., Completed Cohomology - A Survey, 239–257 in this volume.
[6] Colmez, P., La série principale unitaire de GL2(ℚp): vecteurs localement analytiques, preprint 2010.
[7] Colmez, P., Représentations de GL2(ℚp) et (ϕ, Г)-modules, Astérisque 330, 2010, 281–509.Google Scholar
[8] Colmez, P., Fontaine, J.-M., Construction des représentations semi-stables, Inventiones Math. 140, 2000, 1–43.CrossRefGoogle Scholar
[9] Dousmanis, G., Rank two filtered (ϕ, N)-modules with Galois descent data and coefficients, to appear in Trans. of A.M.S.
[10] Emerton, M., Jacquet modules of locally analytic representations of p-adic reductive groups I. Constructions and first properties, Ann. Scient. É.N.S. 39, 2006, 775–839.Google Scholar
[11] Emerton, M., Jacquet modules of locally analytic representations of p-adic reductive groups II. The relation to parabolic induction, to appear in J. Institut Math. Jussieu.
[12] Emerton, M., Local-global compatibility in the p-adic Langlands program for GL2/ℚ, preprint 2010.
[13] Fontaine, J.-M., Représentations p-adiques semi-stables, Astérisque 223, 1994, 113–184.Google Scholar
[14] Frommer, H., The locally analytic principal series of split reductive groups, preprint 2003.
[15] Liu, R., Locally analytic vectors of some crystabelian representations of GL2(ℚp), Compositio Math., to appear.
[16] Orlik, S., Strauch, M., On the irreducibility of locally analytic principal series representations, Representation Theory 14, 2010, 713–746.CrossRefGoogle Scholar
[17] Schneider, P., Nonarchimedan Functional Analysis, Springer Monographs in Maths, 2002.
[18] Schneider, P., Teitelbaum, J., Locally analytic distributions and p-adic representation theory, J. Amer. Math. Soc. 15, 2002, 443–468.CrossRefGoogle Scholar
[19] Schneider, P., Teitelbaum, J., Algebras of p-adic distributions and admissible representations, Inventiones Math. 153, 2003, 145–196.CrossRefGoogle Scholar
[20] Schneider, P., Teitelbaum, J., Banach space representations and Iwasawa theory, Israel J. Math. 127, 2002, 359–380.CrossRefGoogle Scholar
[21] Schraen, B., Représentations p-adiques de GL2(F) et catégories dérivées, Israel J. Math. 176, 2010, 307–362.CrossRefGoogle Scholar
[22] Taylor, R., On Galois representations associated to Hilbert modular forms, Inventiones Math. 98, 1989, 265–280.CrossRefGoogle Scholar

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