Picard and Brauer groups of K(n)-local spectra via profinite Galois descent

Abstract

Using the pro\'etale site, we construct models for the continuous actions of the Morava stabiliser group on Morava E-theory, its ∞-category of K(n)-local modules, and its Picard spectrum. For the two sheaves of spectra, we evaluate the resulting descent spectral sequences: these can be thought of as homotopy fixed point spectral sequences for the profinite Galois extension LK(n) S En. We show that the descent spectral sequence for the Morava E-theory sheaf is the K(n)-local En-Adams spectral sequence. The spectral sequence for the sheaf of Picard spectra is closely related to one recently defined by Heard; our formalism allows us to compare many differentials with those in the K(n)-local En-Adams spectral sequence, and isolate the exotic Picard elements in the 0-stem. In particular, we show how this recovers the computation due to Hopkins, Mahowald and Sadofsky of the group Pic1 at all primes. We also use these methods to bound the Brauer group of K(n)-local spectra, and compute this bound at height one.