Thom spectra, higher THH and tensors in ∞-categories

Abstract

Let f:G Pic(R) be a map of E∞-groups, where Pic(R) denotes the Picard space of an E∞-ring spectrum R. We determine the tensor XR Mf of the Thom E∞-R-algebra Mf with a space X; when X is the circle, the tensor with X is topological Hochschild homology over R. We use the theory of localizations of ∞-categories as a technical tool: we contribute to this theory an ∞-categorical analogue of Day's reflection theorem about closed symmetric monoidal structures on localizations, and we prove that for a smashing localization L of the ∞-category of presentable ∞-categories, the free L-local presentable ∞-category on a small simplicial set K is given by presheaves on K valued on the L-localization of the ∞-category of spaces. If X is a pointed space, a map g: A B of E∞-ring spectra satisfies X-base change if X B is the pushout of A X A along g. Building on a result of Mathew, we prove that if g is \'etale then it satisfies X-base change provided X is connected. We also prove that g satisfies X-base change provided the multiplication map of B is an equivalence. Finally, we prove that, under some hypotheses, the Thom isomorphism of Mahowald cannot be an instance of S0-base change.