A Criterion for Categories on Which Every Grothendieck Topology is Rigid

Let be a small category. The subtoposes of are sometimes all of the form where is a full subcategory of. This is the case for instance when is Cauchy-complete and finite, an Artinian poset, or the simplex category. We call such a category universally rigid. A universally rigid category whose slices are also universally rigid, such as the aforementioned examples, is called stably universally rigid. We provide two equivalent characterizations of such categories. The first one stipulates the existence of a winning strategy in a two-player game, and the second one combines two “local” properties of involving respectively the poset reflections of its slices and its endomorphism monoids.