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Dualité et principe local-global pour les tores sur une courbe au-dessus de C((t))

Pour $K$ un corps global (corps de nombres ou corps de fonctions d'une variable sur un corps fini $F$), on dispose de théorèmes de dualité classiques (Tate, Poitou, Nakayama) pour la cohomologie galoisienne à valeurs dans des tores et des modules abéliens finis. Nous établissons de tels théorèmes pour $K$ le corps des fonctions d'une courbe projective et lisse sur le corps $F={\bf C}((t))$ des séries formelles en une variable sur le corps des complexes. Cela permet de contrôler le défaut du principe de Hasse et l'approximation faible pour les espaces homogènes sous un tore. Il y a ici des différences avec le cas classique ($K$ corps global), et aussi avec le cas récemment étudié où $K$ est un corps de fonctions d'une variable sur un corps $p$-adique. Par exemple, la $K$-rationalité d'un tore n'implique pas ici la validité du principe de Hasse pour ses espaces principaux homogènes. ---------------- Over a global field $K$ (number field, or function field of a curve over a finite field $F$), arithmetic duality theorems for the Galois cohomology of tori and finite Galois modules have long been known. More recent work investigates the case where $K$ is the function fields of of a curve over a $p$-adic field. For $K$ the function field of a curve over the formal series field $F={\bf C}((t))$, we establish analogous duality theorems. We thus control the obstruction to the local-global principle and to weak approximation for homogeneous spaces of tori. There are differences with the afore described cases. For example the Hasse principle need not hold for principal homogeneous spaces of a $K$-rational torus.

preprint2014arXivOpen access

Jean-Louis Colliot-Thélène David Harari

math.AG math.NT

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Jean-Louis Colliot-Thélène David Harari

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Dualité et principe local-global pour les tores sur une courbe au-dessus de C((t))

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