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Motivic decomposition of a compactification of a Merkurjev-Suslin variety
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N. Semenov
Published/Copyright:
May 13, 2008
Abstract
We provide a motivic decomposition of a twisted form of a smooth hyperplane section of Gr(3, 6). This twisted form is a norm variety corresponding to a symbol in the Milnor K-theory 
. As an application we construct a torsion element in the Chow group of this variety.
Received: 2006-09-04
Revised: 2007-02-22
Published Online: 2008-05-13
Published in Print: 2008-April
© Walter de Gruyter Berlin · New York 2008
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Articles in the same Issue
- Characterizations of Bergman space Toeplitz operators with harmonic symbols
- A construction of actions on Kirchberg algebras which induce given actions on their K-groups
- Levine's motivic comparison theorem revisited
- Phénomènes de symétrie dans des formes linéaires en polyzêtas
- Motivic decomposition of a compactification of a Merkurjev-Suslin variety
- On period maps that are open embeddings
- T-spectra and Poincaré duality
- The stable mapping class group of simply connected 4-manifolds
