Graphs with $G^p$-connected medians
Abstract
The median of a graph with weighted vertices is the set of all vertices minimizing the sum of weighted distances from to the vertices of . For any integer , we characterize the graphs in which, with respect to any non-negative weights, median sets always induce connected subgraphs in the th power of . This extends some characterizations of graphs with connected medians (case ) provided by Bandelt and Chepoi (2002). The characteristic conditions can be tested in polynomial time for any . We also show that several important classes of graphs in metric graph theory, including bridged graphs (and thus chordal graphs), graphs with convex balls, bucolic graphs, and bipartite absolute retracts, have -connected medians. Extending the result of Bandelt and Chepoi that basis graphs of matroids are graphs with connected medians, we characterize the isometric subgraphs of Johnson graphs and of halved-cubes with connected medians.
Keywords
Cite
@article{arxiv.2201.12248,
title = {Graphs with $G^p$-connected medians},
author = {Laurine Bénéteau and Jérémie Chalopin and Victor Chepoi and Yann Vaxès},
journal= {arXiv preprint arXiv:2201.12248},
year = {2023}
}
Comments
34 pages, 7 figures