Profinite and discrete G-spectra and iterated homotopy fixed points

Abstract

For a profinite group G, let (-)hG, (-)hdG, and (-)h'G denote continuous homotopy fixed points for profinite G-spectra, discrete G-spectra, and continuous G-spectra (coming from towers of discrete G-spectra), respectively. We establish some connections between the first two notions, and by using Postnikov towers, for K c G (a closed normal subgroup), give various conditions for when the iterated homotopy fixed points (XhK)hG/K exist and are XhG. For the Lubin-Tate spectrum En and G <c Gn, the extended Morava stabilizer group, our results show that EnhK is a profinite G/K-spectrum with (EnhK)hG/K EnhG, by an argument that possesses a certain technical simplicity not enjoyed by either the proof that (Enh'K)h'G/K Enh'G or the Devinatz-Hopkins proof (which requires |G/K| < ∞) of (EndhK)hdG/K EndhG, where EndhK is a construction that behaves like continuous homotopy fixed points. Also, we prove that (in general) the G/K-homotopy fixed point spectral sequence for π((EnhK)hG/K), with E2s,t = Hsc(G/K; πt(EnhK)) (continuous cohomology), is isomorphic to both the strongly convergent Lyndon-Hochschild-Serre spectral sequence of Devinatz for π(EndhG), with E2s,t = Hsc(G/K; πt(EndhK)), and the descent spectral sequence for π((Enh'K)h'G/K).