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Title: An introduction to algebraic K-theory (English)
Author: Ausoni, Christian
Language: English
Journal: Proceedings of the 20th Winter School "Geometry and Physics"
Volume:
Issue: 2000
Year:
Pages: 11-28
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Category: math
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Summary: This paper gives an exposition of algebraic K-theory, which studies functors $K_n:\text{Rings}\to \text{Abelian Groups}$, $n$ an integer. Classically $n=0,1$ introduced by Bass in the mid 60's (based on ideas of Grothendieck and others) and $n=2$ introduced by Milnor [Introduction to algebraic K-theory, Annals of Math. Studies, 72, Princeton University Press, 1971: Zbl 0237.18005]. These functors are defined and applications to topological K-theory (Swan), number theory, topology and geometry (the Wall finiteness obstruction to a CW-complex being finite, Whitehead torsion which classifies $h$-cobordism for closed manifolds of dimension $\geq 5$, and the Hatcher-Wagoner theorem on pseudo-isotopy of differentiable manifolds) are briefly described. Furthermore it is explained in terms of exact sequences and products how the functors $K_i$ are connected. In the mid 1970's Quillen, using methods of homotopy theory, introduced functors $K_n$ for $n$ an arbitrary non-neg! ()
MSC: 16E20
MSC: 18F25
MSC: 19-01
MSC: 19-02
MSC: 55N15
MSC: 55P10
idZBL: Zbl 0978.19001
idMR: MR1826678
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Date available: 2009-07-13T21:44:44Z
Last updated: 2012-11-07
Stable URL: http://hdl.handle.net/10338.dmlcz/701666
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