Obtaining intermediate rings of a local profinite Galois extension without localization

Abstract

Let En be the Lubin-Tate spectrum and let Gn be the nth extended Morava stabilizer group. Then there is a discrete Gn-spectrum Fn, with LK(n)(Fn) En, that has the property that (Fn)hU EnhU, for every open subgroup U of Gn. In particular, (Fn)hGn LK(n)(S0). More generally, for any closed subgroup H of Gn, there is a discrete H-spectrum Zn, H, such that (Zn, H)hH EnhH. These conclusions are obtained from results about consistent k-local profinite G-Galois extensions E of finite vcd, where Lk(-) is LM(LT(-)), with M a finite spectrum and T smashing. For example, we show that Lk(EhH) EhH, for every open subgroup H of G.