Cauchy density
Abstract
In the paper where he defined the Cauchy completion of a V-category, Lawvere also defined a condition on a V-functor which made it analogous to a map of metric spaces whose image is topologically dense in its codomain. We call this condition Cauchy density. In this note, we focus on the fully faithful Cauchy dense V-functors, and show that the Cauchy completion of A is the largest V-category that admits a fully faithful Cauchy dense V-functor from A. Moreover, we show that F A B is fully faithful and Cauchy dense iff [F,C] [B,C] [A,C] is an equivalence for any Cauchy complete C. Finally, we provide examples and characterisations of Cauchy dense functors in various contexts.
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