Tannakization of quasi-categories and monadic descent
Abstract
Given a symmetric monoidal stable ∞-category C and a left adjoint symmetric monoidal fiber functor to ModA for some E∞-ring A, one can construct a derived group scheme G of monoidal automorphisms of this functor. The left adjoint fiber functor also induces a monad on C. Under some finiteness hypothesis on the fiber functor, we show there is a comparison functor from the category of representations of G to the descent category of the induced monad on C.
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