Toposes over which essential implies locally connected

Abstract

We introduce the notion of an EILC topos: a topos E such that every essential geometric morphism with codomain E is locally connected. We then show that the topos of sheaves on a topological space X is EILC if X is Hausdorff (or more generally, if X is Jacobson). Further examples of Grothendieck toposes that are EILC are Boolean \'etendues and classifying toposes of compact groups. Next, we introduce the weaker notion of CILC topos: a topos E such that any geometric morphism f : F E is locally connected, as soon as f* is cartesian closed. We give some examples of topological spaces X and small categories C such that Sh(X) resp. PSh(C) are CILC. Finally, we show that any Boolean elementary topos is CILC.