First-order transducibility among classes of sparse graphs
Abstract
We prove several negative results about first-order transducibility for classes of sparse graphs: - for every , the class of graphs of treewidth at most is not transducible from the class of graphs of treewidth at most ; - for every , the class of graphs with Hadwiger number at most is not transducible from the class of graphs with Hadwiger number at most ; and - the class of graphs of treewidth at most is not transducible from the class of planar graphs. These results are obtained by combining the known upper and lower bounds on the weak coloring numbers of the considered graph classes with the following two new observations: - If a weakly sparse graph class is transducible from a class of bounded expansion, then for some , every graph is a -congested depth- minor of a graph obtained from some by adding a universal vertex. - The operations of adding a universal vertex and of taking -congested depth- minors, for a fixed , preserve the degree of the distance- weak coloring number of a graph class, understood as a polynomial in .
Cite
@article{arxiv.2505.15655,
title = {First-order transducibility among classes of sparse graphs},
author = {Jakub Gajarský and Jeremi Gładkowski and Jan Jedelský and Michał Pilipczuk and Szymon Toruńczyk},
journal= {arXiv preprint arXiv:2505.15655},
year = {2025}
}
Comments
13 pages