A classifying localic category for locally compact locales

Abstract

For an internal category C in a cartesian category C we define, naturally in objects X of C, PrinC(X). This is a category whose objects are principal c C-bundles over X and whose morphisms are principal c(C)-bundles. Here c(\) denotes taking the core groupoid of a category (same objects but only isomorphisms as morphisms) and C is the arrow category of C (objects are morphisms, morphisms are commuting squares). We show that X PrinC(X) is a stack of categories and call stacks of this sort lax-geometric. We then provide two sufficient conditions for a stack to be lax-geometric and use them to prove that the pseudo-functor X LKSh(X) on the category of locales Loc is a lax-geometric stack. Here LKSh(X) is the category of locally compact locales in the topos of sheaves over X, Sh(X). Therefore there exists a localic category CLK such that LKSh(X) PrinCLK(X) naturally for every locale X. Keywords: Topos, locale, principal bundle, internal category and groupoid, category theory, geometric logic, stacks.