Canal-U

Mon compte

Résultats de recherche

Nombre de programmes trouvés : 1887
Cours magistraux

le (1h15m48s)

Valérie Berthé - Fractions continues multidimensionnelles et dynamique (Part 3)

Le but de cet exposé est de présenter des généralisations multidimensionnelles des fractions continues et de l’algorithme d’Euclide d’un point de vue systèmes dynamiques, en nous concentrant sur les liens avec la numération et les substitutions. Nous allons considérer principalement deux types de généralisations, à savoir, les algorithmes définis par homographies, comme l’algorithme de Jacobi-Perron, et les fractions continues associées aux algorithmes de réduction dans les réseaux.
Voir la vidéo
Cours magistraux

le (1h19m6s)

Marie-José Bertin - Des nombres de Salem à la mesure de Mahler de surfaces K3 (Part 2)

Le récent article de McMullen « Dynamics with small entropy on projective K3 surfaces » éclaire d’un jour nouveau les nombres de Salem. Ces entiers algébriques gardent cependant tout leur mystère. On peut tous les obtenir grâce à la construction de Salem (Boyd (1977)) et cependant on ignore s’il en existe un inférieur à 1,1762... Après avoir rappelé la construction de Salem et le théorème de Boyd, on définira la mesure de Mahler logarithmique d’un polynôme de plusieurs variables. On prouvera que la mesure de Mahler ...
Voir la vidéo
Cours magistraux

le (1h3m44s)

Mike Boyle - Nonnegative matrices : Perron Frobenius theory and related algebra (Part 1)

Lecture I. I’ll give a complete elementary presentation of the essential features of the Perron Frobenius theory of nonnegative matrices for the central case of primitive matrices (the "Perron" part). (The "Frobenius" part, for irreducible matrices, and finally the case for general nonnegative matrices, will be described, with proofs left to accompanying notes.) For integer matrices we’ll relate "Perron numbers" to this and Mahler measures. Lecture II. I’ll describe how the Perron-Frobenius theory generalizes (and fails to generalize) to 1,2,... x 1,2,... ...
Voir la vidéo
Cours magistraux

le (1h15m53s)

Mike Boyle - Nonnegative matrices : Perron Frobenius theory and related algebra (Part 2)

Lecture I. I’ll give a complete elementary presentation of the essential features of the Perron Frobenius theory of nonnegative matrices for the central case of primitive matrices (the "Perron" part). (The "Frobenius" part, for irreducible matrices, and finally the case for general nonnegative matrices, will be described, with proofs left to accompanying notes.) For integer matrices we’ll relate "Perron numbers" to this and Mahler measures. Lecture II. I’ll describe how the Perron-Frobenius theory generalizes (and fails to generalize) to 1,2,... x 1,2,... ...
Voir la vidéo
Cours magistraux

le (1h5m18s)

Mike Boyle - Nonnegative matrices : Perron Frobenius theory and related algebra (Part 3)

Lecture I. I’ll give a complete elementary presentation of the essential features of the Perron Frobenius theory of nonnegative matrices for the central case of primitive matrices (the "Perron" part). (The "Frobenius" part, for irreducible matrices, and finally the case for general nonnegative matrices, will be described, with proofs left to accompanying notes.) For integer matrices we’ll relate "Perron numbers" to this and Mahler measures. Lecture II. I’ll describe how the Perron-Frobenius theory generalizes (and fails to generalize) to 1,2,... x 1,2,... ...
Voir la vidéo
Cours magistraux

le (1h19m29s)

Mike Boyle - Nonnegative matrices : Perron Frobenius theory and related algebra (Part 4)

Lecture I. I’ll give a complete elementary presentation of the essential features of the Perron Frobenius theory of nonnegative matrices for the central case of primitive matrices (the "Perron" part). (The "Frobenius" part, for irreducible matrices, and finally the case for general nonnegative matrices, will be described, with proofs left to accompanying notes.) For integer matrices we’ll relate "Perron numbers" to this and Mahler measures. Lecture II. I’ll describe how the Perron-Frobenius theory generalizes (and fails to generalize) to 1,2,... x 1,2,... ...
Voir la vidéo
Cours magistraux

le (1h18m19s)

Alexander Gorodnik - Diophantine approximation and flows on homogeneous spaces (Part 1)

The fundamental problem in the theory of Diophantine approximation is to understand how well points in the Euclidean space can be approximated by rational vectors with given bounds on denominators. It turns out that Diophantine properties of points can be encoded using flows on homogeneous spaces, and in this course we explain how to use techniques from the theory of dynamical systems to address some of questions in Diophantine approximation. In particular, we give a dynamical proof of Khinchin’s theorem and discuss Sprindzuk’s question ...
Voir la vidéo
Cours magistraux

le (1h11m53s)

Alexander Gorodnik - Diophantine approximation and flows on homogeneous spaces (Part 2)

The fundamental problem in the theory of Diophantine approximation is to understand how well points in the Euclidean space can be approximated by rational vectors with given bounds on denominators. It turns out that Diophantine properties of points can be encoded using flows on homogeneous spaces, and in this course we explain how to use techniques from the theory of dynamical systems to address some of questions in Diophantine approximation. In particular, we give a dynamical proof of Khinchin’s theorem and discuss Sprindzuk’s question ...
Voir la vidéo
Cours magistraux

le (1h20m23s)

Alexander Gorodnik - Diophantine approximation and flows on homogeneous spaces (Part 3)

The fundamental problem in the theory of Diophantine approximation is to understand how well points in the Euclidean space can be approximated by rational vectors with given bounds on denominators. It turns out that Diophantine properties of points can be encoded using flows on homogeneous spaces, and in this course we explain how to use techniques from the theory of dynamical systems to address some of questions in Diophantine approximation. In particular, we give a dynamical proof of Khinchin’s theorem and discuss Sprindzuk’s question ...
Voir la vidéo
Cours magistraux

le (1h31m20s)

Franc Forstnerič - Non singular holomorphic foliations on Stein manifolds (Part 1)

A nonsingular holomorphic foliation of codimension on a complex manifold is locally given by the level sets of a holomorphic submersion to the Euclidean space . If is a Stein manifold, there also exist plenty of global foliations of this form, so long as there are no topological obstructions. More precisely, if then any -tuple of pointwise linearly independent (1,0)-forms can be continuously deformed to a -tuple of differentials where is a holomorphic submersion of to . Such a submersion always exists if is no ...
Voir la vidéo

 
FMSH
 
Facebook Twitter
Mon Compte