An algorithm for computing cutpoints in finite metric spaces
Abstract
The theory of the tight span, a cell complex that can be associated to every metric , offers a unifying view on existing approaches for analyzing distance data, in particular for decomposing a metric into a sum of simpler metrics as well as for representing it by certain specific edge-weighted graphs, often referred to as realizations of . Many of these approaches involve the explicit or implicit computation of the so-called cutpoints of (the tight span of) , such as the algorithm for computing the "building blocks" of optimal realizations of recently presented by A. Hertz and S. Varone. The main result of this paper is an algorithm for computing the set of these cutpoints for a metric on a finite set with elements in time. As a direct consequence, this improves the run time of the aforementioned -algorithm by Hertz and Varone by ``three orders of magnitude''.
Cite
@article{arxiv.0910.2317,
title = {An algorithm for computing cutpoints in finite metric spaces},
author = {A. Dress and K. T. Huber and J. Koolen and V. Moulton and A. Spillner},
journal= {arXiv preprint arXiv:0910.2317},
year = {2009}
}
Comments
17 pages, 1 eps-figure