\(R_{cl}\)-spaces and closedness/completeness of certain function spaces in the topology of uniform convergence (Q2922053)

It is known that the concept of \(R_{cl}\)-spaces may be considered as a separation axiom between zero dimensionality and \(R_0\)-spaces [\textit{B. K. Tyagi} et al., Demonstr. Math. 46, No. 1, 229--244 (2013; Zbl 1272.54015)]. In this paper, the authors give basic properties of \(R_{cl}\)-spaces linking them with classical separation axioms. Moreover, the category whose objects are \(R_{cl}\)-spaces and whose arrows \(R_{cl}\)-continuous maps is proved to be a full isomorphism closed, monoreflective (epireflective) subcategory of TOP. If we let \(R_{cl}(X, Y)\) be the function space of all \(R_{cl}\)-supercontinuous functions from a space into a uniform space, then the authors show that this function space is closed in the topology of uniform convergence; this extends some known results.