Homotopy fixed points for L_K(n)(E_n ^ X) using the continuous action

Details Homotopy fixed points for L_K(n)(E_n ^ X) using the continuous action Homotopy fixed points for L_K(n)(E_n ^ X) using the continuous action

2005-01-26

arxiv.org/abs/math/0501474v1

Mathematics

Algebraic Topology

29 pages

Scientific paper

Let G be a closed subgroup of G_n, the extended Morava stabilizer group. Let E_n be the Lubin-Tate spectrum, let X be an arbitrary spectrum with trivial G-action, and define E^(X) to be L_K(n)(E_n ^ X). We prove that E^(X) is a continuous G-spectrum with a G-homotopy fixed point spectrum, defined with respect to the continuous action. Also, we construct a descent spectral sequence whose abutment is the homotopy groups of the G-homotopy fixed point spectrum of E^(X). We show that the homotopy fixed points of E^(X) come from the K(n)-localization of the homotopy fixed points of the spectrum (F_n ^ X).

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