Résultats de recherche
Nombre de programmes trouvés : 15
Cours magistraux
le
(1h31m50s)
C. Soulé - Arithmetic Intersection (Part1)
...Let X be a 2-dimensional, normal, flat, proper scheme over the integers. Assume ¯L and ¯M are two hermitian line bundles over X. Arakelov (and Deligne) defined a real number ¯L.¯M, the arithmetic intersection number of ¯L and ¯M. We shall...
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Cours magistraux
le
(1h10m9s)
C. Soulé - Arithmetic Intersection (Part2)
...Let X be a 2-dimensional, normal, flat, proper scheme over the integers. Assume ¯L and ¯M are two hermitian line bundles over X. Arakelov (and Deligne) defined a real number ¯L.¯M, the arithmetic intersection number of ¯L and ¯M. We shall...
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Cours magistraux
le
(1h26m13s)
C. Soulé - Arithmetic Intersection (Part3)
...Let X be a 2-dimensional, normal, flat, proper scheme over the integers. Assume ¯L and ¯M are two hermitian line bundles over X. Arakelov (and Deligne) defined a real number ¯L.¯M, the arithmetic intersection number of ¯L and ¯M. We shall...
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Cours magistraux
le
(1h24m43s)
C. Soulé - Arithmetic Intersection (Part4)
...Let X be a 2-dimensional, normal, flat, proper scheme over the integers. Assume ¯L and ¯M are two hermitian line bundles over X. Arakelov (and Deligne) defined a real number ¯L.¯M, the arithmetic intersection number of ¯L and ¯M. We shall...
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Cours magistraux
le
(1h31m6s)
G. Freixas i Montplet - Automorphic forms and arithmetic intersections (part 2)
... holomorphic and non-holomorphic modular forms. The formula relates these to arithmetic intersection numbers, that can sometimes be evaluated through variants of the first Kroenecker limit formula. I will first explain these facts, and then show how the...
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Cours magistraux
le
(46m14s)
G.Freixas i Montplet - Automorphic forms and arithmetic intersections (part 3)
... holomorphic and non-holomorphic modular forms. The formula relates these to arithmetic intersection numbers, that can sometimes be evaluated through variants of the first Kroenecker limit formula. I will first explain these facts, and then show how the...
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Cours magistraux
le
(1h2m21s)
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part1)
... explicit formulas for the arithmetic intersection of such divisors and the CM points. We will show that they imply an averaged version of a conjecture of Colmez. Finally we will present the main ingredients in the proof of the conjectures. The...
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Cours magistraux
le
(1h30m57s)
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part2)
... explicit formulas for the arithmetic intersection of such divisors and the CM points. We will show that they imply an averaged version of a conjecture of Colmez. Finally we will present the main ingredients in the proof of the conjectures. The...
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Cours magistraux
le
(1h1m34s)
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part3)
... explicit formulas for the arithmetic intersection of such divisors and the CM points. We will show that they imply an averaged version of a conjecture of Colmez. Finally we will present the main ingredients in the proof of the conjectures. The...
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Cours magistraux
le
(1h33m12s)
F. Andreatta - The height of CM points on orthogonal Shimura varieties and Colmez conjecture (part4)
... explicit formulas for the arithmetic intersection of such divisors and the CM points. We will show that they imply an averaged version of a conjecture of Colmez. Finally we will present the main ingredients in the proof of the conjectures. The...
Voir la vidéo