Mathematics – Algebraic Geometry
Scientific paper
2008-06-02
Mathematics
Algebraic Geometry
minor revision, essentially in final form, to appear in Documenta Math
Scientific paper
We prove a motivic version of Landweber's exact functor theorem from topology. The main result is that the assignment given by a Landweber-type formula using the MGL-homology of a motivic spectrum defines a homology theory on the stable motivic homotopy category and is representable by a Tate-like (or cellular) spectrum. Using the universal coefficient spectral sequence of Dugger-Isaksen we deduce formulas for operations of motivic Landweber spectra of a certain type including homotopy algebraic K-theory. Finally we construct a Chern character as a map between motivic spectra.
Naumann Niko
Spitzweck Markus
Østvær Paul Arne
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