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Paper detail

Hyperconvexity and Tight Span Theory for Diversities

The tight span, or injective envelope, is an elegant and useful construction that takes a metric space and returns the smallest hyperconvex space into which it can be embedded. The concept has stimulated a large body of theory and has applications to metric classification and data visualisation. Here we introduce a generalisation of metrics, called diversities, and demonstrate that the rich theory associated to metric tight spans and hyperconvexity extends to a seemingly richer theory of diversity tight spans and hyperconvexity.

preprint2013arXivOpen access
David BryantPaul F. Tupper
math.MG
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David BryantPaul F. Tupper

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