Diversities and Conformities

TL;DR

This paper extends classical concepts like uniform continuity and convergence to diversities through conformities, establishing a new framework analogous to uniform spaces and exploring their properties and relationships.

Contribution

It introduces conformities as a diversity analogue of uniform spaces, generalizing key topological concepts and establishing their foundational properties and interrelations.

Findings

Conformities generalize uniform spaces to diversities.

The theory of uniform spaces has a natural analogue in conformities.

Restrictions from conformities to uniformities are functorial and related by a natural transformation.

Abstract

Diversities have recently been developed as multiway metrics admitting clear and useful notions of hyperconvexity and tight span. In this note we consider the analytic properties of diversities, in particular the generalizations of uniform continuity, uniform convergence, Cauchy sequences and completeness to diversities. We develop conformities, a diversity analogue of uniform spaces, which abstract these concepts in the metric case. We show that much of the theory of uniform spaces admits a natural analogue in this new structure; for example, conformities can be defined either axiomatically or in terms of uniformly continuous pseudodiversities. Just as diversities can be restricted to metrics, conformities can be restricted to uniformities. We find that these two notions of restriction, which are functors in the appropriate categories, are related by a natural transformation.