Metric Embedding via Shortest Path Decompositions
Abstract
We study the problem of embedding shortest-path metrics of weighted graphs into spaces. We introduce a new embedding technique based on low-depth decompositions of a graph via shortest paths. The notion of Shortest Path Decomposition depth is inductively defined: A (weighed) path graph has shortest path decomposition (SPD) depth . General graph has an SPD of depth if it contains a shortest path whose deletion leads to a graph, each of whose components has SPD depth at most . In this paper we give an -distortion embedding for graphs of SPD depth at most . This result is asymptotically tight for any fixed , while for it is tight up to second order terms. As a corollary of this result, we show that graphs having pathwidth embed into with distortion . For , this improves over the best previous bound of Lee and Sidiropoulos that was exponential in ; moreover, for other values of it gives the first embeddings whose distortion is independent of the graph size . Furthermore, we use the fact that planar graphs have SPD depth to give a new proof that any planar graph embeds into with distortion . Our approach also gives new results for graphs with bounded treewidth, and for graphs excluding a fixed minor.
Cite
@article{arxiv.1708.04073,
title = {Metric Embedding via Shortest Path Decompositions},
author = {Ittai Abraham and Arnold Filtser and Anupam Gupta and Ofer Neiman},
journal= {arXiv preprint arXiv:1708.04073},
year = {2023}
}