The Choquet hyperspace structure for convergence spaces

In the hyperspace Exp X of all closed subsets of a topological space X interval and order topology solely use the c-relation in Exp X for their definitions whereas HAUSDORFB set convergence and VIETORIS topology use neighbourhoods in X itself. Nevertheless there exist intimate but non-trivial relati

Nuclear convergence spaces are studied. I t is s h o r n that an L,-embedded convergence vector space B is L,LM-embeddsd if it is SCHWARTZ and satisfien a certain countability condition which expresses that the set of filters converging to zero is essentially countable Further it is shown that if B

In [10] we introduced a new notion of isomorphisms for topological measure spaces, which preserve almost sure continuity of mappings, almost sure convergence of random variables, and weak convergence of probability measures. The main thrust of that paper is the construction of an isomorphism from a