Model independence of (∞,2)-categorical nerves
Abstract
For most models of (∞,2)-categories an embedding of the ∞-category of 2-categories into that of (∞,2)-categories has been constructed in the form of a nerve construction of some flavor. We prove that all those nerve embeddings induce equivalent functors, modulo change of model. We also show that all the nerve embeddings realize the ∞-category of 2-categories as the sub-∞-category of (∞,2)-categories that are local with respect to a certain class of maps.
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