ON THE MOTIVIC SPECTRAL SEQUENCE

Grigory Garkusha, Ivan Panin

Type: Article

Publication Date: 2015-11-25

Citations: 17

DOI: https://doi.org/10.1017/s1474748015000419

Abstract

It is shown that the Grayson tower for $K$ -theory of smooth algebraic varieties is isomorphic to the slice tower of $S^{1}$ -spectra. We also extend the Grayson tower to bispectra, and show that the Grayson motivic spectral sequence is isomorphic to the motivic spectral sequence produced by the Voevodsky slice tower for the motivic $K$ -theory spectrum $\mathit{KGL}$ . This solves Suslin’s problem about these two spectral sequences in the affirmative.

Locations

Journal of the Institute of Mathematics of Jussieu - View
arXiv (Cornell University) - View - PDF
DataCite API - View

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+	Derived categories for Grothendieck categories of enriched functors	2018	Grigory Garkusha Darren Jones
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+	Bloch-Kato Conjecture and Motivic Cohomology with Finite Coefficients	2000	Andrei Suslin Vladimir Voevodsky
+	The Equivalence of Grayson and Friedlander-Suslin Spectral Sequences	2013	O. B. Podkopaev
+ PDF Chat	The Grothendieck duality theorem via Bousfield’s techniques and Brown representability	1996	Amnon Neeman
+ PDF Chat	Weight filtrations via commuting automorphisms	1995	Daniel R. Grayson
+ PDF Chat	Spectra and symmetric spectra in general model categories	2001	Mark Hovey
+ PDF Chat	The spectral sequence relating algebraic K-theory to motivic cohomology	2002	Eric M. Friedlander
+ PDF Chat	Adams operations on higherK-theory	1992	Daniel R. Grayson
+ PDF Chat	A1-homotopy theory of schemes	1999	Fabien Morel Vladimir Voevodsky
+	Motivic Homotopy Theory	2008	Marc Levine
+ PDF Chat	Algebraic K-theory of spaces	1985	Friedhelm Waldhausen