The topological Singer construction

Abstract

We study the continuous (co-)homology of towers of spectra, with emphasis on a tower with homotopy inverse limit the Tate construction XtG on a G-spectrum X. When G=Cp is cyclic of prime order and X=Bp is the p-th smash power of a bounded below spectrum B with H*(B) of finite type, we prove that (Bp)tCp is a topological model for the Singer construction R+(H*(B)) on H*(B). There is a map epsilonB : B --> (Bp)tCp inducing the ExtA-equivalence epsilon : R+(H*(B)) --> H*(B). Hence epsilonB and the canonical map Gamma : (Bp)Cp --> (Bp)hCp are p-adic equivalences.