Mathematics – Algebraic Topology
Scientific paper
2006-10-29
Mathematics
Algebraic Topology
26 pages; added appendix (joint), which gives an example of a non-hyperfibrant discrete G-spectrum; Thm. 7.6 added; expanded S
Scientific paper
When G is a profinite group and H and K are closed subgroups, with H normal in K, it is not known, in general, how to form the iterated homotopy fixed point spectrum (Z^{hH})^{hK/H}, where Z is a continuous G-spectrum and all group actions are to be continuous. However, we show that, if G=G_n, the extended Morava stabilizer group, and Z=L_{K(n)}(E_n \wedge X), where L_{K(n)} is Bousfield localization with respect to Morava K-theory, E_n is the Lubin-Tate spectrum, and X is any spectrum with trivial G_n-action, then the iterated homotopy fixed point spectrum can always be constructed. Also, we show that (E_n^{hH})^{hK/H} is just E_n^{hK}, extending a result of Devinatz and Hopkins.
Davis Daniel G.
Wieland Ben
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