A Lower Bound for Light Spanners in General Graphs
Abstract
A recent upper bound by Le and Solomon [STOC '23] has established that every -node graph has a -spanner with lightness . This bound is optimal up to its dependence on ; the remaining open problem is whether this dependence can be improved or perhaps even removed entirely. We show that the -dependence cannot in fact be completely removed. For constant and for , we show a lower bound on lightness of For example, this implies that there are graphs for which any -spanner has lightness , improving on the previous lower bound of . An unusual feature of our lower bound is that it is conditional on the girth conjecture with parameter rather than . We additionally show that this implies certain technical limitations to improving our lower bound further. In particular, under the same conditional, generalizing our lower bound to all \emph{or} obtaining an optimal -dependence are as hard as proving the girth conjecture for all constant .
Cite
@article{arxiv.2406.04459,
title = {A Lower Bound for Light Spanners in General Graphs},
author = {Greg Bodwin and Jeremy Flics},
journal= {arXiv preprint arXiv:2406.04459},
year = {2024}
}