Coarse Balanced Separators and Tree-Decompositions
Abstract
A classical result of Robertson and Seymour (1986) states that the treewidth of a graph is linearly tied to its separation number: the smallest integer such that, for every weighting of the vertices, the graph admits a balanced separator of size at most . Motivated by recent progress on coarse treewidth, Abrishami, Czy\.{z}ewska, Kluk, Pilipczuk, Pilipczuk, and Rz\k{a}\.{z}ewski (2025) conjectured a coarse analogue to this result: every graph that has a balanced separator consisting of a bounded number of balls of bounded radius is quasi-isometric to a graph with bounded treewidth. In this paper, we confirm their conjecture for -induced-subgraph-free graphs when the separator consists of a bounded number of balls of radius . In doing so, we bridge two important conjectures concerning the structure of graphs that exclude a planar graph as an induced minor.
Cite
@article{arxiv.2505.06550,
title = {Coarse Balanced Separators and Tree-Decompositions},
author = {Maria Chudnovsky and Robert Hickingbotham},
journal= {arXiv preprint arXiv:2505.06550},
year = {2025}
}