Topological Hochschild Homology of K/p as a Kp module

Abstract

Let R be an E∞-ring spectrum. Given a map ζ from a space X to BGL1R, one can construct a Thom spectrum, Xζ, which generalises the classical notion of Thom spectrum for spherical fibrations in the case R=S0, the sphere spectrum. If X is a loop space ( Y) and ζ is homotopy equivalent to f for a map f from Y to B2GL1R, then the Thom spectrum has an A∞-ring structure. The Topological Hochschild Homology of these A∞-ring spectra is equivalent to the Thom spectrum of a map out of the free loop space of Y. This paper considers the case X=S1, R=Kp, the p-adic K-theory spectrum, and ζ = 1-p ∈ π1BGL1Kp. The associated Thom spectrum (S1)ζ is equivalent to the mod p K-theory spectrum K/p. The map ζ is homotopy equivalent to a loop map, so the Thom spectrum has an A∞-ring structure. I will compute π*THHKp(K/p) using its description as a Thom spectrum.