Non-singular maps in toposes with a local state classifier

Abstract

Recent progress on the question of the size of the class of connected and hyperconnected geometric morphisms from a given topos has led to the definition of local state classifier. We discuss a historical precedent which leads to the notion of non-singular map and we show that, for a topos E with a local state classifier, and each object X therein, the domain of the full subcategory of E/X consisting of non-singular maps over X is a topos, and that the inclusion is the inverse image functor of a hyperconnected geometric morphism. The prospective geometric applications direct our attention to local state classifiers in toposes `of spaces'. We show that, at least in the pre-cohesive topos of reflexive graphs, the local state classifier, which is a colimit by definition, may be characterized as a limit; more specifically, as a variant of a subobject classifier.