A multiplicative tate spectral sequence for compact Lie group actions

Given a compact Lie group G and a commutative orthogonal ring spectrum R such that R[G]* = π*(R ? G+) is finitely generated and projective over π*(R), we construct a multiplicative G-Tate spectral sequence for each R-module X in orthogonal G-spectra, with E2-page given by the Hopf algebra Tate cohomology of R[G]* with coefficients in π*(X). Under mild hypotheses, such as X being bounded below and the derived page RE∞ vanishing, this spectral sequence converges strongly to the homotopy π*(XtG) of the G-Tate construction XtG = [EG ? F(EG+, X]G.

1. Introduction 2. Tate Cohomology for Hopf Algebras 3. Homotopy Groups of Orthogonal $G$-Spectra 4. Sequences of Spectra and Spectral Sequences 5. The $G$-Homotopy Fixed Point Spectral Sequence 6. The $G$-Tate Spectral Sequence