English

Topological $k$-metrics

Computational Geometry 2023-08-10 v1

Abstract

Metric spaces (X,d)(X, d) are ubiquitous objects in mathematics and computer science that allow for capturing (pairwise) distance relationships d(x,y)d(x, y) between points x,yXx, y \in X. Because of this, it is natural to ask what useful generalizations there are of metric spaces for capturing "kk-wise distance relationships" d(x1,,xk)d(x_1, \ldots, x_k) among points x1,,xkXx_1, \ldots, x_k \in X for k>2k > 2. To that end, G\"{a}hler (Math. Nachr., 1963) (and perhaps others even earlier) defined kk-metric spaces, which generalize metric spaces, and most notably generalize the triangle inequality d(x1,x2)d(x1,y)+d(y,x2)d(x_1, x_2) \leq d(x_1, y) + d(y, x_2) to the "simplex inequality" d(x1,,xk)i=1kd(x1,,xi1,y,xi+1,,xk)d(x_1, \ldots, x_k) \leq \sum_{i=1}^k d(x_1, \ldots, x_{i-1}, y, x_{i+1}, \ldots, x_k). (The definition holds for any fixed k2k \geq 2, and a 22-metric space is just a (standard) metric space.) In this work, we introduce strong kk-metric spaces, kk-metric spaces that satisfy a topological condition stronger than the simplex inequality, which makes them "behave nicely." We also introduce coboundary kk-metrics, which generalize p\ell_p metrics (and in fact all finite metric spaces induced by norms) and minimum bounding chain kk-metrics, which generalize shortest path metrics (and capture all strong kk-metrics). Using these definitions, we prove analogs of a number of fundamental results about embedding finite metric spaces including Fr\'{e}chet embedding (isometric embedding into \ell_{\infty}) and isometric embedding of all tree metrics into 1\ell_1. We also study relationships between families of (strong) kk-metrics, and show that natural quantities, like simplex volume, are strong kk-metrics.

Keywords

Cite

@article{arxiv.2308.04609,
  title  = {Topological $k$-metrics},
  author = {Willow Barkan-Vered and Huck Bennett and Amir Nayyeri},
  journal= {arXiv preprint arXiv:2308.04609},
  year   = {2023}
}
R2 v1 2026-06-28T11:51:24.586Z