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Tamagawa numbers and
other invariants of pseudoreductive groups over global
function fields
Zev Rosengarten |
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Vol. 15 (2021), No. 8, 1865–1920
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Abstract |
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We study Tamagawa numbers and other invariants (especially Tate–Shafarevich sets) attached to commutative and pseudoreductive groups over global function fields. In particular, we prove a simple formula for Tamagawa numbers of commutative groups and pseudoreductive groups. We also show that the Tamagawa numbers and Tate–Shafarevich sets of such groups are invariant under inner twist, as well as proving a result on the cohomology of such groups which extends part of classical Tate duality from commutative groups to all pseudoreductive groups. Finally, we apply this last result to show that for suitable quotient spaces by commutative or pseudoreductive groups, the Brauer–Manin obstruction is the only obstruction to strong (and weak) approximation. |
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Keywords
Tamagawa numbers, linear algebraic groups, pseudoreductive
groups, Tate–Shafarevich sets
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Mathematical Subject Classification 2010
Primary: 11R58
Secondary: 11R56, 11R34, 11E99
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Milestones
Received: 27 June 2018
Revised: 16 January 2021
Accepted: 15 February 2021
Published: 10 November 2021
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Authors |
| Zev Rosengarten | |
| Einstein Institute of
Mathematics Edmond J. Safra Campus The Hebrew University of Jerusalem Jerusalem Israel |
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