The Vietoris functor and modal operators on rings of continuous functions

Abstract

We introduce an endofunctor H on the category bal of bounded archimedean -algebras and show that there is a dual adjunction between the category Alg(H) of algebras for H and the category Coalg(V) of coalgebras for the Vietoris endofunctor V on the category of compact Hausdorff spaces. We also introduce an endofunctor Hu on the reflective subcategory of bal consisting of uniformly complete objects of bal and show that Gelfand duality lifts to a dual equivalence between Alg(Hu) and Coalg(V). On the one hand, this generalizes a result of Abr88,KKV04 for the category of coalgebras of the Vietoris endofunctor on the category of Stone spaces. On the other hand, it yields an alternate proof of a recent result of BCM20a.