On minimum spanning tree-like metric spaces
Abstract
We attempt to shed new light on the notion of 'tree-like' metric spaces by focusing on an approach that does not use the four-point condition. Our key question is: Given metric space on points, when does a fully labelled positive-weighted tree exist on the same vertices that precisely realises using its shortest path metric? We prove that if a spanning tree representation, , of exists, then it is isomorphic to the unique minimum spanning tree in the weighted complete graph associated with , and we introduce a fourth-point condition that is necessary and sufficient to ensure the existence of whenever each distance in is unique. In other words, a finite median graph, in which each geodesic distance is distinct, is simply a tree. Provided that the tie-breaking assumption holds, the fourth-point condition serves as a criterion for measuring the goodness-of-fit of the minimum spanning tree to , i.e., the spanning tree-likeness of . It is also possible to evaluate the spanning path-likeness of . These quantities can be measured in and time, respectively.
Keywords
Cite
@article{arxiv.1505.06145,
title = {On minimum spanning tree-like metric spaces},
author = {Momoko Hayamizu and Kenji Fukumizu},
journal= {arXiv preprint arXiv:1505.06145},
year = {2015}
}
Comments
9 pages, 3 figures