A Criterion for Categories on which every Grothendieck Topology is Rigid
Abstract
Let C be a Cauchy-complete category. The subtoposes of [Cop,Set] are sometimes all of the form [Dop,Set] where D is a full subcategory of C. This is the case for instance when C is finite, an Artinian poset, or the simplex category. In order to unify these situations, we characterize the small categories C such that for every X ∈ C, every subtopos of [Cop,Set] is induced by a subcategory of C/X. We provide two equivalent characterizations. The first one uses a two-player game, and the second one combines two "local" properties of C involving respectively the poset reflections of its slices and its endomorphism monoids.
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