The relative GAGA Theorem and an application to the analytic mapping stacks
Abstract
We prove a relative GAGA theorem for perfect and pseudo-coherent complexes in non-archimedean analytic geometry, allowing bases given by Fredholm analytic rings, including those associated from affinoid perfectoid spaces. This answers a question raised in heuer2024padicnonabelianhodgetheory. As an application, we show that for a proper scheme \(X\) and an Artin stack \(Y\) with suitable conditions, the analytification of the algebraic mapping stack \(Map(X,Y)\) agrees with the intrinsic analytic mapping stack \(Map(Xan,Yan)\).
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