Sketching Distances in Monotone Graph Classes
Abstract
We study the two-player communication problem of determining whether two vertices are nearby in a graph , with the goal of determining the graph structures that allow the problem to be solved with a constant-cost randomized protocol. Equivalently, we consider the problem of assigning constant-size random labels (sketches) to the vertices of a graph, which allow adjacency, exact distance thresholds, or approximate distance thresholds to be computed with high probability from the labels. Our main results are that, for monotone classes of graphs: constant-size adjacency sketches exist if and only if the class has bounded arboricity; constant-size sketches for exact distance thresholds exist if and only if the class has bounded expansion; constant-size approximate distance threshold (ADT) sketches imply that the class has bounded expansion; any class of constant expansion (i.e. any proper minor closed class) has constant-size ADT sketches; and a class may have arbitrarily small expansion without admitting constant-size ADT sketches.
Cite
@article{arxiv.2202.09253,
title = {Sketching Distances in Monotone Graph Classes},
author = {Louis Esperet and Nathaniel Harms and Andrey Kupavskii},
journal= {arXiv preprint arXiv:2202.09253},
year = {2023}
}
Comments
39 pages, 1 figure. v2: revised version