Approximating Euclidean Shallow-Light Trees
Abstract
For a weighted graph and a designated source vertex , a spanning tree that simultaneously approximates a shortest-path tree w.r.t. source and a minimum spanning tree is called a shallow-light tree (SLT). Specifically, an -SLT of w.r.t. is a spanning tree of with root-stretch (preserving all distances between and the other vertices up to a factor of ) and lightness (its weight is at most times the weight of a minimum spanning tree of ). Despite the large body of work on SLTs, the basic question of whether a better approximation algorithm exists was left untouched to date, and this holds in any graph family. This paper makes a first nontrivial step towards this question by presenting two bicriteria approximation algorithms. For any , a set of points in constant-dimensional Euclidean space and a source , our first (respectively, second) algorithm returns, in time, a non-Steiner (resp., Steiner) tree with root-stretch and weight at most (resp., ), where denotes the minimum weight of a non-Steiner (resp., Steiner) tree with root-stretch .
Cite
@article{arxiv.2512.10797,
title = {Approximating Euclidean Shallow-Light Trees},
author = {Hung Le and Shay Solomon and Cuong Than and Csaba D. Tóth and Tianyi Zhang},
journal= {arXiv preprint arXiv:2512.10797},
year = {2025}
}
Comments
The abstract has been truncated to satisfy the arXiv character limit