Several homotopy fixed point spectral sequences in telescopically localized algebraic K-theory

Abstract

Let n ≥ 1, p a prime, and T(n) any representative of the Bousfield class of the telescope vn-1F(n) of a finite type n complex. Also, let En be the Lubin-Tate spectrum, K(En) its algebraic K-theory spectrum, and Gn the extended Morava stabilizer group, a profinite group. Motivated by an Ausoni-Rognes conjecture, we show that there are two spectral sequences \[I-3muE2s,t πt-s((LT(n+1)K(En))hGn) II-2muE2s,t\] with common abutment π(-) of the continuous homotopy fixed points of LT(n+1)K(En), where I-3muE2s,t is continuous cohomology with coefficients in a certain tower of discrete Gn-modules. If the tower satisfies the Mittag-Leffler condition, then there are continuous cochain cohomology groups \[I-3muE2, Hcts(Gn, π(LT(n+1)K(En))) II-2muE2,.\] We isolate two hypotheses, the first of which is true when (n,p) = (1,2), that imply (LT(n+1)K(En))hGn LT(n+1)K(LK(n)S0). Also, we show that there is a spectral sequence \[Hscts(Gn, πt(K(En) T(n+1))) πt-s((K(En) T(n+1))hGn).\]