A p-adic Simpson correspondence for singular rigid-analytic varieties
Abstract
Let C be a complete, algebraically closed non-archimedean extension of Qp, and X be a proper rigid-analytic variety over C. We show that the category of pro-étale vector bundles on X is equivalent to the category of Higgs bundles on the -site of X, thereby generalizing the work of Faltings and Heuer to arbitrary proper rigid-analytic varieties.
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