Bichromatic Geometric Spanners
Abstract
For an edge-weighted graph and a stretch parameter , a -spanner is a subgraph such that the shortest path distances in and satisfy for all . In metric spanners, is a finite metric space, and is the complete graph with edge weights corresponding to the distances between the endpoints. When is the complete graph on points in the plane, -size -spanners are possible for any : For every , there is an -spanner with edges (i.e., the stretch can be arbitrarily close to 1). When is the complete bipartite graph on bichromatic points in the plane, in general, no spanner construction can guarantee stretch with edges. Bose et al.~(SICOMP 2009) constructed a -spanner with edges for any constant . Our main result is a new construction for a -spanner with edges. Eliminating the factor resolves a problem left open for more than 17 years, and raises a new research problem about optimizing the dependence on . We also study spanners for on bichromatic points on the real line: In this case, we show that the MST of is a 7-spanner, and we construct a 3-spanner with at most edges.
Cite
@article{arxiv.2607.10062,
title = {Bichromatic Geometric Spanners},
author = {Theodore Fung and Csaba D. Tóth},
journal= {arXiv preprint arXiv:2607.10062},
year = {2026}
}
Comments
19 pages, 7 figures