The "Galois Correspondence" for n-Stacks
Abstract
We prove an essentially surjective Galois-correspondence-like functor for n-stacks. More specifically, it gives an essentially surjective functor from the ∞-category of n-stacks of finite sets with an action of the fundamental group of X to the ∞-category of Deligne-Mumford n-stacks finite \'etale over a connected scheme X.
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