Structured flow categories and twisted presheaves

Abstract

An orientation theory for flow categories without bubbling is determined by a functor of ∞-categories μ C U/O. For any such functor, we construct a stable ∞-category Flowμ of μ-structured flow categories and bimodules. We also construct the expected functors between such ∞-categories, giving a tractable framework for manipulating orientations, local systems, and filtrations in exact Floer homotopy theory. Classifying spaces for certain bordism theories determined by μ appear as mapping spaces in Flowμ, and we use a Pontrjagin--Thom construction to naturally identify Flowμ with the ∞-category of μ-twisted presheaves on C.

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