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On the slice spectral
sequence
John Ullman |
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Algebraic & Geometric Topology 13 (2013) 1743–1755
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Abstract |
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We introduce a variant of the slice spectral sequence which uses only regular slice cells, and state the precise relationship between the two spectral sequences. We analyze how the slice filtration of an equivariant spectrum that is concentrated over a normal subgroup is related to the slice filtration of its geometric fixed points, and use this to prove a conjecture of Hill on the slice filtration of an Eilenberg-MacLane spectrum (arXiv:1107.3582v1). We also show how the (co)connectivity of a spectrum results in the (co)connectivity of its slice tower, demonstrating the “efficiency” of the slice spectral sequence. |
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Keywords
slice, spectral sequence, equivariant, stable homotopy
groups
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Mathematical Subject Classification 2010
Primary: 55T99, 55N91, 55P91
Secondary: 55Q91
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References |
Publication
Received: 12 June 2012
Revised: 29 October 2012
Accepted: 12 November 2012
Published: 18 May 2013
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Authors |
| John Ullman | |
| Department of Mathematics Massachusetts Institute of Technology 77 Massachusetts Avenue Cambridge, MA 02139 USA |
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| http://math.mit.edu/~jrullman/ | |
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