New weighted additive spanners
Abstract
Ahmed, Bodwin, Sahneh, Kobourov, and Spence (WG 2020) introduced additive spanners for weighted graphs and constructed (i) a spanner with edges and (ii) a spanner with edges, and (iii) a spanner with edges, for any weighted graph with vertices. Here is the maximum edge weight in the graph. Their results for , , and match the state-of-the-art bounds for the unweighted counterparts where . They left open the question of constructing a spanner with edges. Elkin, Gitlitz, and Neiman (DISC 2021) made significant progress on this problem by showing that there exists a spanner with edges for any fixed constant . Indeed, their result is stronger as the additive stretch is local: the stretch for any pair is where is the maximum weight edge on the shortest path from to . In this work, we resolve the problem posted by Ahmed et al. (WG 2020) up to a poly-logarithmic factor in the number of edges: We construct a spanner with edges. We extend the construction for -spanners of Woodruff (ICALP 2010), and our main contribution is an analysis tailoring to the weighted setting. The stretch of our spanner could also be made local, in the sense of Elkin, Gitlitz, and Neiman (DISC 2021). We also study the fast constructions of additive spanners with and stretches. We obtain, among other things, an algorithm for constructing a spanner of edges in time.
Keywords
Cite
@article{arxiv.2408.14638,
title = {New weighted additive spanners},
author = {An La and Hung Le},
journal= {arXiv preprint arXiv:2408.14638},
year = {2024}
}
Comments
18 pages, 1 figures