Universal Spaces and Splittings of Equivariant Spectra
Abstract
Let G be a finite group. We re-analyze the splitting of rational G-spectra, which is discussed in Barne's thesis and traces back to Greenlees and May. We will study how the splitting behaves under a localization which is weaker than rationalization and discuss its application in computing equivariant cohomology of G-spectra. In particular, we will explicitly compute π(HZ) and π(HAG) for the dihedral group G=D2p. The additive structures and partial multiplicative structures are already computed by Kriz, Lu, and Zou. Our new method will provide a systematic way to compute them as RO(D2p)-graded rings.
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