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On reduction map for étale K-theory of curves
Authors:
- Grzegorz Marian Banaszak,
- Wojciech Gajda,
- Piotr Krasoń
Abstract
In this paper we investigate reduction of nontorsion elements in the étale K-theory of a curve X over a global field F. We show that the reduction map can be well understood in terms of Galois cohomology of l-adic representations.
- Record ID
- UAM2ba9ffe5d1704df99cc846df53515acd
- Author
- Journal series
- Homology Homotopy and Applications, ISSN 1532-0073
- Issue year
- 2005
- Vol
- 7
- No
- 3
- Pages
- 1-10
- ASJC Classification
- DOI
- DOI:10.4310/HHA.2005.v7.n3.a1 Opening in a new tab
- URL
- https://www.intlpress.com/site/pub/pages/journals/items/hha/content/vols/0007/0003/a001/index.php Opening in a new tab
- Language
- (en) English
- File
-
- File: 1
- HHA-2005-0007-0003-a001.pdf
-
- Score (nominal)
- 0
- Score source
- journalList
- Publication indicators
- = 8; = 9; : 2005 = 1.192; : 2007 (2 years) = 0.327 - 2010 (5 years) =0.548
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- Uniform Resource Identifier
- https://researchportal.amu.edu.pl/info/article/UAM2ba9ffe5d1704df99cc846df53515acd/
- URN
urn:amu-prod:UAM2ba9ffe5d1704df99cc846df53515acd
* presented citation count is obtained through Internet information analysis and it is close to the number calculated by the Publish or PerishOpening in a new tab system.