Homotopy groups of homotopy fixed point spectra associated to En

Abstract

We compute the mod(p) homotopy groups of the continuous homotopy fixed point spectrum E2hH2 for p>2, where En is the Landweber exact spectrum whose coefficient ring is the ring of functions on the Lubin-Tate moduli space of lifts of the height n Honda formal group law over Fpn, and Hn is the subgroup WFxpn wreath product Gal(Fpn/Fp) of the extended Morava stabilizer group Gn. We examine some consequences of this related to Brown-Comenetz duality and to finiteness properties of homotopy groups of K(n)*-local spectra. We also indicate a plan for computing pi*(EnhHn smash V(n-2)), where V(n-2) is an En*-local Toda complex.