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Motivic twisted K–theory
Markus Spitzweck and Paul Arne Østvær
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Algebraic & Geometric Topology 12
(2012) 565–599
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Abstract
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This paper sets out basic properties of motivic twisted K–theory with respect to
degree three motivic cohomology classes of weight one. Motivic twisted K–theory is
defined in terms of such motivic cohomology classes by taking pullbacks along the
universal principal BGm–bundle for the classifying space of the multiplicative group
scheme Gm. We show a Künneth isomorphism for homological motivic twisted
K–groups computing the latter as a tensor product of K–groups over the K–theory
of BGm. The proof employs an Adams Hopf algebroid and a trigraded Tor-spectral
sequence for motivic twisted K–theory. By adapting the notion of an E∞–ring
spectrum to the motivic homotopy theoretic setting, we construct spectral sequences
relating motivic (co)homology groups to twisted K–groups. It generalizes
various spectral sequences computing the algebraic K–groups of schemes over
fields. Moreover, we construct a Chern character between motivic twisted
K–theory and twisted periodized rational motivic cohomology, and show that it
is a rational isomorphism. The paper includes a discussion of some open
problems.
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Keywords
motivic homotopy theory, twisted
K–theory, motivic cohomology, bundle, Adams Hopf
algebroid
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Mathematical Subject Classification
Primary: 14F42, 19L50, 55P43
Secondary: 14F99, 19D99
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Publication
Received: 7 April 2011
Revised: 29 November 2011
Accepted: 19 December 2011
Published: 29 March 2012
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