On the Curvature of Metric Triples

Abstract

In this article, we introduce a notion of curvature, denoted by kX(T), for a metric triple T inside a (possibly discrete) metric space X. Such a notion enables us to consider curvature information of any metric space, including discrete metric spaces such as those generated by scientific data. To define the notion, we employ the information consisting of side lengths of the triple as well as the minimum total distance from vertices of the triple to points of the metric space. Those information provides us a unique number kX(T) such that the triple T can be isometrically embedded into the model space Mk2 up to k kX(T). The value kX(T) agrees with the usual curvature when X is a convex subset of a model space. We also show that the curvature kX(T) of any metric triple T inside a CAT(k) space is bounded above by k.