Decidable objects and molecular toposes

Abstract

We study several sufficient conditions for the molecularity/local-connectedness of geometric morphisms. In particuar, we show that if S is a Boolean topos then, for every hyperconnected essential geometric morphism p : E → S such that the leftmost adjoint p! preserves finite products, p is molecular and p* : S → E coincides with the full subcategory of decidable objects in E. We also characterize the reflections between categories with finite limits that induce molecular maps between the respective presheaf toposes. As a corollary we establish the molecularity of certain geometric morphisms between Gaeta toposes.

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