A Classifying groupoid for compact Hausdorff locales
Abstract
We construct a localic groupoid GKH such that for any locale X the category of compact Hausdorff locales in the topos of sheaves over X is equivalent to a category whose objects are principal GKH-bundles over X and whose morphisms are S-homotopies (where S is the Sierpi\'nski locale). This result can be intuitively viewed as the compact Hausdorff dual of the well known result from topos theory that there is an object classifier.
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