A lift from group cohomology to spectra for trivial profinite actions

Abstract

Let G be a profinite group, X a discrete G-spectrum with trivial action, and XhG the continuous homotopy fixed points. For any N o G ("o" for open), X = XN is a G/N-spectrum with trivial action. We construct a zigzag colim\,N \,XhG/N colim\,N \,(XhN)hG/N XhG, where is a weak equivalence. When is a weak equivalence, this zigzag gives an interesting model for XhG (for example, its Spanier-Whitehead dual is holim\,N \,F(XhG/N, S0)). We prove that this happens in the following cases: (1) |G| < ∞; (2) X is bounded above; (3) there exists \U\ cofinal in \N\, such that for each U, Hsc(U, π(X)) = 0, for s > 0. Given (3), for each U, there is a weak equivalence X XhU and XhG XhG/U. For case (3), we give a series of corollaries and examples. As one instance of a family of examples, if p is a prime, K(np,p) the npth Morava K-theory K(np) at p for some np ≥ 1, and Zp the p-adic integers, then for each m ≥ 2, (3) is satisfied when G ≤slant Πp ≤ m Zp is closed, X = p > m (HQ K(np,p)), and \U\ := \NG NG o G\.