A metric topology for causally continuous completions

A shrinking criterion for upper semicontinuous decompositions of a locally compact metric space is extended to complete metric spaces, answering a question of . This particular criterion thus fits into the general framework exhibited by the other results in this area (Daverman, 1986, Sections 5 and

For a continuous poset P , let ω(P ) and λ(P ) be the lower topology and the Lawson topology on P , respectively. In this paper, we constructively prove in the set theory ZFDC ω (the theory obtained by adjoining the axiom of ω dependent choices to the Zermelo-Fraenkel set theory) that if all lower c

As a generalization of the classical metric scaling solution for a finite set of points, a countable set of uncorrelated random variables is obtained from an arbitary continuous random variable \(X\). The properties of these variables allow us to regard them as principal axes for \(X\) with respect