Dear all, I submitted the following paper a few months ago, Title: ``Applying enriched categories to quasi-uniform spaces'' Abstract: The represention of complete metric spaces of \cite{Law73} by enrichments is extented to quasi-uniform spaces. Moreover quasi-uniformly continuous maps are described as enriched functors. The quasi-uniform space completion is also viewed as a Cauchy-completion. Super monoidal functors are introduced to obtain these results. A 2-category of enrichments over different bases is defined. In this general context the Cauchy-completion is still a universal construction. Law73 is here the paper of F.W.Lawvere: ``Metric spaces, generalized logic and closed categories'' It is accessible on the site http://www.mcs.le.ac.uk/research/publications as the 6th research report of the year 2000. All the best. Vincent Schmitt