The inverse limit topology and profinite descent on Picard groups in K(n)-local homotopy theory

Abstract

In this paper, we study profinite descent theory for Picard groups in K(n)-local homotopy theory through their inverse limit topology. Building upon Burklund's result on the multiplicative structures of generalized Moore spectra, we prove that the module category over a K(n)-local commutative ring spectrum is equivalent to the limit of its base changes by a tower of generalized Moore spectra of type n. As a result, the K(n)-local Picard groups are endowed with a natural inverse limit topology. This topology allows us to identify the entire E1 and E2-pages of a descent spectral sequence for Picard spaces of K(n)-local profinite Galois extensions. Our main examples are K(n)-local Picard groups of homotopy fixed points EnhG of the Morava E-theory En for all closed subgroups G of the Morava stabilizer group Gn. The G=Gn case has been studied by Heard and Mor. At height 1, we compute Picard groups of E1hG for all closed subgroups G of G1=Zp× at all primes as a Mackey functor.