Spaces of continuous functions, box products and almost--resolvable spaces
A dense-in-itself space is called -discrete if the space of real continuous functions on with its box topology, , is a discrete space. A space is called almost--resolvable provided that is the union of a countable increasing family of subsets each of them with an empty interior. We analyze these classes of spaces by determining their relations with -resolvable and almost resolvable spaces. We prove that every almost--resolvable space is -discrete, and that these classes coincide in...