Showing total 3 results

1. Représentations galoisiennes p-adiques et (phi,tau)-modules

Author

Xavier Caruso, Institut de Recherche Mathématique de Rennes ( IRMAR ), Université de Rennes 1 ( UR1 ), Université de Rennes ( UNIV-RENNES ) -Université de Rennes ( UNIV-RENNES ) -AGROCAMPUS OUEST-École normale supérieure - Rennes ( ENS Rennes ) -Institut National de Recherche en Informatique et en Automatique ( Inria ) -Institut National des Sciences Appliquées ( INSA ) -Université de Rennes 2 ( UR2 ), Université de Rennes ( UNIV-RENNES ) -Centre National de la Recherche Scientifique ( CNRS ), ANR-09-JCJC-0048-01 CETHop,ANR-09-JCJC-0048-01 CETHop, Institut de Recherche Mathématique de Rennes (IRMAR), AGROCAMPUS OUEST, Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro)-Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro)-Université de Rennes 1 (UR1), Université de Rennes (UNIV-RENNES)-Université de Rennes (UNIV-RENNES)-Université de Rennes 2 (UR2), Université de Rennes (UNIV-RENNES)-École normale supérieure - Rennes (ENS Rennes)-Centre National de la Recherche Scientifique (CNRS)-Institut National des Sciences Appliquées - Rennes (INSA Rennes), Institut National des Sciences Appliquées (INSA)-Université de Rennes (UNIV-RENNES)-Institut National des Sciences Appliquées (INSA), ANR-09-JCJC-0048,CETHop,Calculs effectifs en théorie de Hodge p-adique(2009), Université de Rennes (UR)-Institut National des Sciences Appliquées - Rennes (INSA Rennes), Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-École normale supérieure - Rennes (ENS Rennes)-Université de Rennes 2 (UR2)-Centre National de la Recherche Scientifique (CNRS)-INSTITUT AGRO Agrocampus Ouest, and Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro)-Institut national d'enseignement supérieur pour l'agriculture, l'alimentation et l'environnement (Institut Agro)

Subjects

14G20, Pure mathematics, Mathematics - Number Theory, General Mathematics, Mathematics::Number Theory, 010102 general mathematics, Prime number, représentations semi-stables, Field (mathematics), Extension (predicate logic), 01 natural sciences, 11F85, [MATH.MATH-NT]Mathematics [math]/Number Theory [math.NT], Combinatorics, 11S20, [ MATH.MATH-NT ] Mathematics [math]/Number Theory [math.NT], 0103 physical sciences, Pi, 010307 mathematical physics, Nabla symbol, 0101 mathematics, Link (knot theory), représentations galoisiennes p-adiques, Mathematics

Abstract

Let p be an odd prime number and K be a p-adic field. In this paper, we develop an analogue of Fontaine's theory of (phi,Gamma)-modules replacing the p-cyclotomic extension by the extension K_infty obtained by adding to K a compatible system of p^n-th roots of a fixed uniformizer pi of K. As a result, we obtain a new classification of p-adic representations of G_K = Gal(Kbar/K) by some (phi, \tau)-modules. We then make a link between the theory of (phi,tau)-modules discussed above and the so-called theory of (phi,N_nabla)$-modules developped by Kisin. As a corollary, we answer a question of Tong Liu: we prove that, if K is a finite extension of Q_p, every representation of G_K of E(u)-finite height is potentially semi-stable., Comment: 51 pages serious problem in Section 3 fixed; 2010-65

Published

2013

2. Corps de nombres peu ramifies et formes automorphes autoduales

Author

Laurent Clozel, Gaëtan Chenevier, Centre de Mathématiques Laurent Schwartz (CMLS), École polytechnique (X)-Centre National de la Recherche Scientifique (CNRS), Laboratoire de Mathématiques d'Orsay (LM-Orsay), Université Paris-Sud - Paris 11 (UP11)-Centre National de la Recherche Scientifique (CNRS), and Chenevier, Gaetan

Subjects

Trace (linear algebra), General Mathematics, media_common.quotation_subject, Mathematics::Number Theory, 01 natural sciences, Combinatorics, 11R32, 11F70, 0103 physical sciences, FOS: Mathematics, Number Theory (math.NT), 0101 mathematics, Representation Theory (math.RT), [MATH.MATH-RT] Mathematics [math]/Representation Theory [math.RT], Mathematics::Representation Theory, Finite set, media_common, Mathematics, Mathematics - Number Theory, [MATH.MATH-RT]Mathematics [math]/Representation Theory [math.RT], Applied Mathematics, 010102 general mathematics, Algebraic extension, 16. Peace & justice, Infinity, Injective function, [MATH.MATH-NT]Mathematics [math]/Number Theory [math.NT], Algebra, 010307 mathematical physics, Mathematics - Representation Theory, Symplectic geometry, [MATH.MATH-NT] Mathematics [math]/Number Theory [math.NT]

Abstract

Let S be a finite set of primes, p in S, and Q_S a maximal algebraic extension of Q unramified outside S and infinity. Assume that |S|>=2. We show that the natural maps Gal(Q_p^bar/Q_p) --> Gal(Q_S/Q) are injective. Much of the paper is devoted to the problem of constructing selfdual automorphic cuspidal representations of GL(2n,A_Q) with prescribed properties at all places, that we study via the twisted trace formula of J. Arthur. The techniques we develop shed also some lights on the orthogonal/symplectic alternative for selfdual representations of GL(2n)., 50 pages, french. Section 4.18 has been extended : let F be a totally real field and \pi a selfdual cuspidal automorphic representation of GL(2n,A_F) which is cohomological at all the archimedean places and discrete at a finite place at least, we show that for each place v the L-parameter of \pi_v preserves a non-degenerate symplectic pairing

Published

2009

3. Representations p-adiques et equations differentielles

Author

Laurent Berger, Theorie des Nombres, Université Pierre et Marie Curie - Paris 6 (UPMC), Université Pierre et Marie Curie - Paris VI, Colmez Pierre, Berger, Laurent, Unité de Mathématiques Pures et Appliquées (UMPA-ENSL), and École normale supérieure de Lyon (ENS de Lyon)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Pure mathematics, {é}quations diff{é}rentielles $p$-adiques, Differential equation, General Mathematics, [MATH.MATH-AC]Mathematics [math]/Commutative Algebra [math.AC], Mathematics::Number Theory, monodromie $p$-adique, [MATH] Mathematics [math], Unipotent, 01 natural sciences, cristallines, Mathematics - Algebraic Geometry, th{é}orie de Hodge $p$-adique, 0103 physical sciences, isocristaux surconvergents, 0101 mathematics, [MATH]Mathematics [math], Mathematics, Conjecture, Functor, Mathematics - Number Theory, P{é}riodes $p$-adiques, Hodge theory, 010102 general mathematics, de de Rham, 11Gxx, 11Sxx, 12H25, 13K05, 14F30, semi-stables, Mathematics - Commutative Algebra, [MATH.MATH-NT]Mathematics [math]/Number Theory [math.NT], Monodromy, Gravitational singularity, 010307 mathematical physics, [MATH.MATH-AG]Mathematics [math]/Algebraic Geometry [math.AG], repr{é}sentations $p$-adiques ordinaires, Structured program theorem

Abstract

In this paper, we associate to every $p$-adic representation $V$ a $p$-adic differential equation $\mathbf{D}^{\dagger}_{\mathrm{rig}}(V)$, that is to say a module with a connection over the Robba ring. We do this via the theory of Fontaine's $(\phi,\Gamma_K)$-modules. This construction enables us to relate the theory of $(\phi,\Gamma_K)$-modules to $p$-adic Hodge theory. We explain how to construct $mathbf{D}_{mathrm{cris}}(V)$ and $\mathbf{D}_{\mathrm{st}}(V)$ from $\mathbf{D}^{\dagger}_{\mathrm{rig}}(V)$, which allows us to recognize semi-stable or crystalline representations; the connection is then either unipotent or trivial on $\mathbf{D}^{\dagger}_{\mathrm{rig}}(V)[1/t]$. In general, the connection has an infinite number of regular singularities, but we show that $V$ is de Rham if and only if those are apparent singularities. A structure theorem for modules over the Robba ring allows us to get rid of all singularities at once, and to obtain a ``classical'' differential equation, with a Frobenius structure. A recent theorem of Y. Andr\'e gives a complete description of the structure of such an object. This allows us to prove Fontaine's $p$-adic monodromy conjecture: every de Rham representation is potentially semi-stable. As an application, we can extend to the case of arbitrary perfect residue fields some results of Hyodo ($H^1_g=H^1_{st}$), of Perrin-Riou (the semi-stability of ordinary representations), of Colmez (absolutely crystalline representations are of finite height), and of Bloch and Kato (if the weights of $V$ are $\geq 2$, then Bloch-Kato's exponential $\exp_V$ is an isomorphism)., Comment: 71 pages. In French. Uses Xypic. 3rd Version: this revised version includes a proof of Fontaine's monodromy conjecture and some applications. Submitted for publication

Published

2001