The K-theory cochains of H-spaces and height 1 chromatic homotopy theory

Abstract

Fix an odd prime p. Let X be a pointed space whose p-completed K-theory KUp*(X) is an exterior algebra on a finite number of odd generators; examples include odd spheres and many H-spaces. We give a generators-and-relations description of the E∞-KUp-algebra spectrum KUpX+ of KUp-cochains of X. To facilitate this construction, we describe a K(1)-local analogue of the Tor spectral sequence for E1-ring spectra. Combined with previous work of Bousfield, this description of the cochains of X recovers a result of Kjaer that the v1-periodic homotopy type of X can be modelled by these cochains. This then implies that the Goodwillie tower of the height 1 Bousfield-Kuhn functor converges for such X.