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02:28:10
Maxim Kontsevich A meeting on the occasion of the 75th birthday of Yuri Ivanovich
Maxim Kontsevich (IHÉS) Geometry of Bridgeland's stability
02:29:58
Alexander Beilinson A meeting on the occasion of the 75th birthday of Yuri Ivanovich MANIN
Alexander Beilinson (University of Chicago)On the p-adic period map
03:11
Diaporama de l'exposition de photo "Les Défricheurs"
Diaporama de l'exposition de photo "Les Défricheurs" inspirée de l'exposition "Les déchiffreurs" organisée par l'IHÉS basée sur le livre éponyme "Les déchiffreurs, voyage en mathématiques" de Jean-François Dars, Annick Lesne et Anne Papillault. Diaporama réalisé par le Lycée d'Excellence de Douai.
02:28
Diaporama des conférences de Pierre Vanhove sur la théorie des cordes et de Claire Voisin sur la géométrie projective
Diaporama de la conférence de Pierre Vanhove, le 16 janvier 2012 : "Au bout de la corde... les deux infinis" et de la conférence de Claire Voisin, le 23 janvier 2012 : "Géométrie projective"; toutes deux au lycée d'Excellence de Douai. Ces conférences se sont déroulées dans le cadre du Tour de France des déchiffreurs, organisées par l'IHÉS et la Cité des Géométries de Jeumont pour les étapes dans la région Nord-Pas de Calais. Evénement soutenu par la Caisse des Dépôts, Belin et Pour la Science. Diaporama réalisé par le Lycée d'Excellence de Douai.
02:13:31
Mikhail Kapranov A meeting on the occasion of the 75th birthday of Yuri Ivanovich MANIN
Mikhail Kapranov (Yale University)Higher Segal spaces
02:54:29
Vladimir Drinfeld A meeting on the occasion of the 75th birthday of Yuri Ivanovich MANIN
Independence of l of the set of irreducible l-adic local systems on a smooth variety over a finite field (first part).
02:49:43
2 - Fundamental groups, non-abelian cohomology and Diophantine geometry
This course will give a brief introduction to fundamental groups from the point of view of arithmetic geometry and discuss a few applications, concentrating on the Diophantine geometry of curves.
01:57:50
4 - Fundamental groups, non-abelian cohomology and Diophantine geometry
This course will give a brief introduction to fundamental groups from the point of view of arithmetic geometry and discuss a few applications, concentrating on the Diophantine geometry of curves.
02:08:01
3 - Fundamental groups, non-abelian cohomology and Diophantine geometry
This course will give a brief introduction to fundamental groups from the point of view of arithmetic geometry and discuss a few applications, concentrating on the Diophantine geometry of curves.
02:42:11
1 - Fundamental groups, non-abelian cohomology and Diophantine geometry
This course will give a brief introduction to fundamental groups from the point of view of arithmetic geometry and discuss a few applications, concentrating on the Diophantine geometry of curves.
01:21:06
Évariste Galois et la théorie de l'ambiguïté
Conférence à l'académie des sciences par Alain ConnesÉvariste Galois et la théorie de l'ambiguïtéL'un des aspects des idées de Galois qui s’est imposé le plus facilementparmi les outils conceptuels des scientifiques de notre époque, est celui degroupe de symétrie. Grâce à cet acquis il n'est pas irréaliste d'espérer queles textes de Galois soient devenus accessibles au scientifique nonmathématicien.J’essaierai, après avoir évoqué les relations fort complexes entre ÉvaristeGalois et les académiciens de son temps, de lire avec vous le textefondateur de Galois, en l’illustrant de la manière la plus concrète etexplicite possible.Alain CONNESSite :http://www.academie-sciences.fr/activite/conf/conf2011.htmSupport pdf : http://www.academie-sciences.fr/activite/conf/exposeConnes_291111_diapo.pdf
25:42
8 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
37:23
7 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
18:43
6 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
37:23
5 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
30:10
4 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
37:23
3 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
30:10
2 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
37:23
1 Wall Crossing (Maxim Kontsevich and Andrew Neitzke)
Wall crossing is a relatively new fenomen which appears in several mathematical frameworks.Our goal in this series of lectures is to introduce the community of specialists in flat surfaces and Teichmuller flow (and everybody in fact!) to the new exiting developments giving new viempoints on the familiar objects, and proposing new venyes for generalizations.
01:35:21
Perfectoid Spaces and the Weight-Monodromy Conjecture (6/6) Peter SCHOLZE
Courses in Arithmetics and Algebraic GeometryPerfectoid Spaces and the Weight-Monodromy ConjecturePeter SCHOLZEusually Thursdays 14h30-16h30Marilyn and James Simons Conference Centre or Léon Motchane Amphitheatre, IHÉSJointly organized and founded by the Institut des Hautes Études Scientifique and the Fondation mathématique Jacques Hadamard Organizers Ahmed Abbes (CNRS, IHÉS), Christophe Breuil (CNRS, Université Paris-Sud), Laurent Lafforgue (IHÉS)This new series of courses aims at presenting recent results or works in progress in Arithmetic Geometry, that bring significant breakthroughs in their area or shed new insights on classical results. Speakers will be chosen among the main contributors to these works, observing a balance between young and senior experts in the field.Two or three courses will be organised per year. Each course will consists of a series of 4 to 6 two-hour sessions over one month. Speakers are kindly requested to be understandable by non specialists (especially students), at least for the first sessions.
