English

Bounding twin-width for bounded-treewidth graphs, planar graphs, and bipartite graphs

Discrete Mathematics 2022-01-25 v1 Data Structures and Algorithms Combinatorics

Abstract

Twin-width is a newly introduced graph width parameter that aims at generalizing a wide range of "nicely structured" graph classes. In this work, we focus on obtaining good bounds on twin-width tww(G)\text{tww}(G) for graphs GG from a number of classic graph classes. We prove the following: - tww(G)32tw(G)1\text{tww}(G) \leq 3\cdot 2^{\text{tw}(G)-1}, where tw(G)\text{tw}(G) is the treewidth of GG, - tww(G)max(4bw(G),92bw(G)3)\text{tww}(G) \leq \max(4\text{bw}(G),\frac{9}{2}\text{bw}(G)-3) for a planar graph GG with bw(G)2\text{bw}(G) \geq 2, where bw(G)\text{bw}(G) is the branchwidth of GG, - tww(G)183\text{tww}(G) \leq 183 for a planar graph GG, - the twin-width of a universal bipartite graph (X,2X,E)(X,2^X,E) with X=n|X|=n is nlog2(n)+O(1)n - \log_2(n) + \mathcal{O}(1) . An important idea behind the bounds for planar graphs is to use an embedding of the graph and sphere-cut decompositions to obtain good bounds on neighbourhood complexity.

Keywords

Cite

@article{arxiv.2201.09749,
  title  = {Bounding twin-width for bounded-treewidth graphs, planar graphs, and bipartite graphs},
  author = {Hugo Jacob and Marcin Pilipczuk},
  journal= {arXiv preprint arXiv:2201.09749},
  year   = {2022}
}

Comments

13 pages, 2 figures

R2 v1 2026-06-24T09:00:25.209Z