Cyclotomic structure in the topological Hochschild homology of $DX$

Abstract

Let $X$ be a finite CW complex, and let $DX$ be its dual in the category of spectra. We demonstrate that the Poincar\'e/Koszul duality between $THH(DX)$ and the free loop space $\Sigma^\infty_+ LX$ is in fact a genuinely $S^1$-equivariant duality that preserves the $C_n$-fixed points. Our proof uses an elementary but surprisingly useful rigidity theorem for the geometric fixed point functor $\Phi^G$ of orthogonal $G$-spectra.Comment: Accepted version, 46 pages. Replaces the first half of the earlier preprint "On the topological Hochschild homology of $DX$." Part of the author's thesi