Tate cohomology and periodic localization of polynomial functors
成果类型:
Article
署名作者:
Kuhn, NJ
署名单位:
University of Virginia
刊物名称:
INVENTIONES MATHEMATICAE
ISSN/ISSBN:
0020-9910
DOI:
10.1007/s00222-003-0354-z
发表日期:
2004
页码:
345-370
关键词:
stable-homotopy theory
bousfield classes
spectrum
SPACES
segal
摘要:
In this paper, we show that Goodwillie calculus, as applied to functors from stable homotopy to itself, interacts in striking ways with chromatic aspects of the stable category. Localized at a fixed prime p, let T(n) be the telescope of a v(n) self map of a finite S-module of type n. The Periodicity Theorem of Hopkins and Smith implies that the Bousfield localization functor associated to T(n)(*) is independent of choices. Goodwillie's general theory says that to any homotopy functor F from S-modules to S-modules, there is an associated tower under F, {PdF}, such that F-->PdF is the universal arrow to a d-excisive functor. Our first main theorem says that PdF-->Pd-1F always admits a homotopy section after localization with respect to T(n)(*) (and so also after localization with respect to Morava K-theory K(n)(*)). Thus, after periodic localization, polynomial functors split as the product of their homogeneous factors. This theorem follows from our second main theorem which is equivalent to the following: for any finite group G, the Tate spectrum T-G(T(n)) is weakly contractible. This strengthens and extends previous theorems of Greenlees-Sadofsky, Hovey-Sadofsky, and Mahowald-Shick. The Periodicity Theorem is used in an essential way in our proof. The connection between the two theorems is via a reformulation of a result of McCarthy on dual calculus.
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