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Nombre de programmes trouvés : 882
Conférences

le (55m8s)

B. Rémy - Génération de groupes topologiques simples

Les groupes finis simples sont connus pour être engendrés par des paires d’éléments bien choisies. On peut se poser la même question avec des groupes topologiques : que peut-on espérer comme partie engendrant un sous-groupe dense ? Évidemment, la réponse dépend des groupes considérés ; on y répondra partiellement pour des groupes de matrices, et on évoquera les nombreuses questions ouvertes dans le domaine.
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Cours magistraux

le (1h50m34s)

Giovanni Alberti - Introduction to minimal surfaces and finite perimeter sets (Part 1)

In these lectures I will first recall the basic notions and results that are needed to study minimal surfaces in the smooth setting (above all the area formula and the first variation of the area), give a short review of the main (classical) techniques for existence results, and then outline the theory of Finite Perimeter Sets, including the main results of the theory (compactness, structure of distributional derivative, rectifiability). If time allows, I will conclude with a few applications.  
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Cours magistraux

le (1h23m9s)

Giovanni Alberti - Introduction to minimal surfaces and finite perimeter sets (Part 2)

In these lectures I will first recall the basic notions and results that are needed to study minimal surfaces in the smooth setting (above all the area formula and the first variation of the area), give a short review of the main (classical) techniques for existence results, and then outline the theory of Finite Perimeter Sets, including the main results of the theory (compactness, structure of distributional derivative, rectifiability). If time allows, I will conclude with a few applications.
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Cours magistraux

le (1h23m42s)

Giovanni Alberti - Introduction to minimal surfaces and finite perimeter sets (Part 3)

In these lectures I will first recall the basic notions and results that are needed to study minimal surfaces in the smooth setting (above all the area formula and the first variation of the area), give a short review of the main (classical) techniques for existence results, and then outline the theory of Finite Perimeter Sets, including the main results of the theory (compactness, structure of distributional derivative, rectifiability). If time allows, I will conclude with a few applications.
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Cours magistraux

le (1h26m22s)

Giovanni Alberti - Introduction to minimal surfaces and finite perimeter sets (Part 4)

In these lectures I will first recall the basic notions and results that are needed to study minimal surfaces in the smooth setting (above all the area formula and the first variation of the area), give a short review of the main (classical) techniques for existence results, and then outline the theory of Finite Perimeter Sets, including the main results of the theory (compactness, structure of distributional derivative, rectifiability). If time allows, I will conclude with a few applications.
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Cours magistraux

le (1h27m50s)

Giovanni Alberti - Introduction to minimal surfaces and finite perimeter sets (Part 5)

In these lectures I will first recall the basic notions and results that are needed to study minimal surfaces in the smooth setting (above all the area formula and the first variation of the area), give a short review of the main (classical) techniques for existence results, and then outline the theory of Finite Perimeter Sets, including the main results of the theory (compactness, structure of distributional derivative, rectifiability). If time allows, I will conclude with a few applications.
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