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Семинар отдела алгебры
26 мая 2009 г. 15:00, г. Москва, МИАН, комн. 540 (ул. Губкина, 8)
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О гипотезе Гротендика–Серра про главные $G$-расслоения, где $G$ – полупростая группа
И. А. Панин |
Количество просмотров: |
Эта страница: | 304 |
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Аннотация:
Let $R$ be a regular semi-local ring containing an infinite perfect subfield and let $K$ be its field of fractions. Let $G$ be a reductive $R$-group scheme satifying a mild “isotropy condition”. Then each principal $G$-bundle $P$ which becomes trivial over $K$ is trivial itself. If $R$ is of geometric type, then it suffices to assume that $R$ is of geometric type over an infinite field. Two main Theorems of Panin, Stavrova and Vavilov proven recently state the same results for semi-simple simply connected $R$-group schemes. Our proof is heavily based on those two theorems and on a classical result of Colliot–Théléne and Sansuc.
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