Temporal Cliques Admit Sparse Spanners
Abstract
Let be an undirected graph on vertices and a mapping that assigns to every edge a non-empty set of integer labels (times). Such a graph is {\em temporally connected} if a path exists with non-decreasing times from every vertex to every other vertex. In a seminal paper, Kempe, Kleinberg, and Kumar \cite{KKK02} asked whether, given such a temporal graph, a {\em sparse} subset of edges always exists whose labels suffice to preserve temporal connectivity -- a {\em temporal spanner}. Axiotis and Fotakis \cite{AF16} answered negatively by exhibiting a family of -dense temporal graphs which admit no temporal spanner of density . In this paper, we give the first positive answer as to the existence of -sparse spanners in a dense class of temporal graphs, by showing (constructively) that if is a complete graph, then one can always find a temporal spanner of density .
Cite
@article{arxiv.1810.00104,
title = {Temporal Cliques Admit Sparse Spanners},
author = {Arnaud Casteigts and Joseph G. Peters and Jason Schoeters},
journal= {arXiv preprint arXiv:1810.00104},
year = {2021}
}
Comments
This version of the article will appear in JCSS and a short version with the same title was presented at ICALP 2019