An algebraic model for rational S1-equivariant stable homotopy theory
Abstract
Greenlees defined an abelian category A whose derived category is equivalent to the rational S1-equivariant stable homotopy category whose objects represent rational S1-equivariant cohomology theories. We show that in fact the model category of differential graded objects in A (dgA) models the whole rational S1-equivariant stable homotopy theory. That is, we show that there is a Quillen equivalence between dgA and the model category of rational S1-equivariant spectra, before the quasi-isomorphisms or stable equivalences have been inverted. This implies that all of the higher order structures such as mapping spaces, function spectra and homotopy (co)limits are reflected in the algebraic model. The new ingredients here are certain Massey product calculations and the work on rational stable model categories from "Classification of stable model categories" and "Equivalences of monoidal model categories" with Schwede. In an appendix we show that Toda brackets, and hence also Massey products, are determined by the triangulated derived category.
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