Global spaces and the homotopy theory of stacks
Abstract
We show that the ∞-category of global spaces is equivalent to the homotopy localization of the ∞-category of sheaves on the site of separated differentiable stacks, following a philosophy proposed by Gepner-Henriques. We further prove that this ∞-category of sheaves is a cohesive ∞-topos and that it fully faithfully contains the singular-cohesive ∞-topos of Sati-Schreiber.
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