Completeness, Closedness and Metric Reflections of Pseudometric Spaces

Abstract

It is well-known that a metric space (X, d) is complete iff the set X is closed in every metric superspace of (X, d). For a given pseudometric space (Y, ), we describe the maximal class CEC(Y, ) of superspaces of (Y, ) such that (Y, ) is complete if and only if Y is closed in every (Z, ) ∈ CEC(Y, ). We also introduce the concept of pseudoisometric spaces and prove that spaces are pseudoisometric iff their metric reflections are isometric. The last result implies that a pseudometric space is complete if and only if this space is pseudoisometric to a complete pseudometric space.