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Groupe de Brauer non ramifié de quotients par un groupe fini

Let k be a field, G a finite group embedded in the k-group SL(n). For k an algebraically closed field, Bogomolov gave a formula for the unramified Brauer group of the quotient SL(n)/G. We develop his method over any characteristic zero field. This purely algebraic method enables us to recover and generalize results of Harari and of Demarche over number fields, such as the triviality of the unramified Brauer group for k=Q and G of odd order. --- Soient k un corps et G un groupe fini plongé dans le k-groupe SL(n).Pour k algébriquement clos, Bogomolov a donné une formule pour le groupe de Brauer non ramifié du quotient SL(n)/G. On examine ce que donne sa méthode sur un corps k quelconque (de caractéristique nulle). Par cette méthode purement algébrique, on retrouve et étend des résultats obtenus par Harari et par Demarche au moyen de méthodes arithmétiques, comme la trivialité du groupe de Brauer non ramifié pour k= Q et G d'ordre impair.

preprint2012arXivOpen access
Jean-Louis Colliot-Thélène
math.AGmath.NT
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Jean-Louis Colliot-Thélène

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