The Segal conjecture for topological Hochschild homology of complex cobordism
Abstract
We study the Cp-equivariant Tate construction on the topological Hochschild homology THH(B) of a symmetric ring spectrum B by relating it to a topological version R+(B) of the Singer construction, extended by a natural circle action. This enables us to prove that the fixed and homotopy fixed point spectra of THH(B) are p-adically equivalent for B = MU and BP. This generalizes the classical Cp-equivariant Segal conjecture, which corresponds to the case B = S.
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