Cartier duality for gerbes of vector bundles

Abstract

We prove a Cartier duality for gerbes of algebraic and analytic vector bundles as an anti-equivalence of Hopf algebras in the category of kernels of analytic stacks. As an application, we prove that the category of solid quasi-coherent sheaves on the Hodge-Tate stack of a smooth rigid variety over an algebraically closed field C of mixed characteristic (0,p) is equivalent to the category of weight 1 sheaves on Bhatt-Zhang's Simpson gerbe.

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