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Single angle The Galois type of an Abelian surface

Auteurs : Fité, Francesc (Auteur de la Conférence)
CIRM (Editeur )

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    Résumé : This series of three talks is the first part of an introductory course on the generalized Sato-Tate conjecture, made in collaboration with Andrew V. Sutherland at the Winter School "Frobenius distributions on curves", celebrated in Luminy in February 2014. In the first talk, some general background following Serre's works is introduced: equidistribution and its connexion to L-functions, the Sato-Tate group and the Sato-Tate conjecture. In the second talk, we present the Sato-Tate axiomatic, which leads us to some Lie group theoretic classification results. The last part of the talk is devoted to illustrate the methods involved in the proof of this kind of results by considering a concrete example. In the third and final talk, we present Banaszak and Kedlaya's algebraic version of the Sato-Tate conjecture, we describe the notion of Galois type of an abelian variety, and we establish the dictionary between Galois types and Sato-Tate groups of abelian surfaces defined over number fields.
    generalized Sato-Tate conjecture - Sato-Tate group - equidistribution - Sato-Tate axioms - Galois type - Abelian surfaces - endomorphism algebra - Frobenius distributions

    11G10 - Abelian varieties of dimension > 1, See also {14Kxx}
    11G20 - Curves over finite and local fields
    14G10 - Zeta-functions and related questions
    14K15 - Arithmetic ground fields, See also {11Dxx,11Fxx,11Gxx,14Gxx}
    11M50 - Relations with random matrices

    Informations sur la rencontre

    Nom du congrès : Jean-Morlet Chair - Doctoral school : Frobenius distribution on curves / Chaire Jean-Morlet - Ecole doctorale : distribution de Frobenius sur des courbes
    Organisteurs Congrès : Kohel, David ; Ritzenthaler, Christophe ; Shparlinski, Igor
    Dates : 17/02/14 - 28/02/14
    Année de la rencontre : 2014
    URL Congrès : http://shparlinskikohel.weebly.com/abstr...

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