Every K(n)-local spectrum is the homotopy fixed points of its Morava module

Abstract

Let n ≥ 1 and let p be any prime. Also, let En be the Lubin-Tate spectrum, Gn the extended Morava stabilizer group, and K(n) the nth Morava K-theory spectrum. Then work of Devinatz and Hopkins and some results due to Behrens and the first author of this note, show that if X is a finite spectrum, then the localization LK(n)(X) is equivalent to the homotopy fixed point spectrum (LK(n)(En X))hGn, which is formed with respect to the continuous action of Gn on LK(n)(En X). In this note, we show that this equivalence holds for any (S-cofibrant) spectrum X. Also, we show that for all such X, the strongly convergent Adams-type spectral sequence abutting to π(LK(n)(X)) is isomorphic to the descent spectral sequence that abuts to π((LK(n)(En X))hGn).