An Enriched Approach to the Strictification of (∞,1)-Categories

Abstract

We define a functor which takes in an (∞,1)-category and outputs an (ω,1)-category, the natural maximally "strict" version of an (∞,1)-category. We do this by modeling (∞,1)-categories as categories enriched in ∞-groupoids, and then "locally strictifying" (applying the strictification of ∞-groupoids to each hom space) to obtain a category enriched in ω-groupoids with respect to the Gray tensor product, followed by "globally strictifying" (strictifying the enrichment from the Gray tensor product to the cartesian product) to obtain a category cartesian-enriched in ω-groupoids, which is equivalently an (ω,1)-category. We prove that this functor is conservative by proving a slightly stronger statement on systems of chain complexes parameterized by the homotopy (2,1)-category of an (∞,1)-category, and explain how this generalizes the Homological Whitehead Theorem from spaces to (∞,1)-categories.

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