Cartesian closed exact completions in topology

Abstract

Using generalized enriched categories, in this paper we show that Rosick\'y's proof of cartesian closedness of the exact completion of the category of topological spaces can be extended to a wide range of topological categories over Set, like metric spaces, approach spaces, ultrametric spaces, probabilistic metric spaces, and bitopological spaces. In order to do so we prove a sufficient criterion for exponentiability of (T,V)-categories and show that, under suitable conditions, every (T,V)-injective category is exponentiable in (T,V)-Cat.