On some convergence approach structures on hyperspaces

Abstract

In the context of the category Cap of convergence approach spaces and contractions, we introduce and study approach analogs of the upper and lower Kuratowski convergences, upper-Fell and Fell topologies on the set of closed subsets of the coreflection on the category Conv of convergence spaces of a convergence approach space. In particular, over a pre-approach space, the Conv-coreflection of the lower Kuratowski convergence approach structure is the lower Kuratowski convergence associated with the Conv-coreflection of the base space, while the Conv-reflection is the lower Kuratowski convergence associated with the Conv-reflection. The Conv-coreflection of the upper Kuratowski convergence approach is is the upper Kuratowski convergence associated with the Conv-reflection of the base space, while the Conv-reflection is the upper Kuratowski convergence associated with the Conv-coreflection of the base space. We show that, over an approach space, the lower Kuratowski convergence approach structure is in fact an approach structure that coincides with the -Vietoris approach structure introduced by Lowen and his collaborators, though it may be strictly finer over a general convergence approach space. We show that the upper Fell convergence approach structure is a non-Archimedean approach structure coarser than the upper Kuratowski convergence approach, but finer than the upper Fell approach structure introduced by the first and third author. We also obtain a Cap abstraction of the classical result that if the upper Kuratowski convergence over a topological space is pretopological, then it is also topological.