Moduli spaces in p-adic non-abelian Hodge theory
Abstract
We propose a new moduli-theoretic approach to the p-adic Simpson correspondence for a smooth proper rigid space X over Cp with coefficients in any rigid analytic group G, in terms of a comparison of moduli stacks. For its formulation, we introduce the class of "smoothoid spaces" which are perfectoid families of smooth rigid spaces, well-suited for studying relative p-adic Hodge theory. For any smoothoid space Y, we then construct a "sheafified non-abelian Hodge correspondence", namely a canonical isomorphism \[R1G HiggsG\] where :Yv Yet is the natural morphism of sites, and where HiggsG is the sheaf of isomorphism classes of G-Higgs bundles on Yet. We also prove a generalisation of Faltings' local p-adic Simpson correspondence to G-bundles and to perfectoid families. We apply these results to deduce v-descent criteria for \'etale G-bundles which show that G-Higgs bundles on X form a small v-stack HiggsG. As a second application, we construct an analogue of the Hitchin morphism on the Betti side: a morphism BunG,v AG from the small v-stack of v-topological G-bundles on X to the Hitchin base. This allows us to give a conjectural reformulation of the p-adic Simpson correspondence for X in a more geometric and more canonical way, namely in terms of a comparison of Hitchin morphisms.
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