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Reduced bandwidth: A qualitative strengthening of twin-width in minor-closed classes (and beyond)open access

Authors
Bonnet, ÉdouardKwon, O-joungWood, David R.
Issue Date
May-2026
Publisher
ACADEMIC PRESS INC ELSEVIER SCIENCE
Keywords
Reduced bandwidth; Twin-width; Planar graph; Minor-closed class
Citation
JOURNAL OF COMBINATORIAL THEORY SERIES B, v.178, pp 27 - 66
Pages
40
Indexed
SCIE
SCOPUS
Journal Title
JOURNAL OF COMBINATORIAL THEORY SERIES B
Volume
178
Start Page
27
End Page
66
URI
https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/210398
DOI
10.1016/j.jctb.2025.11.010
ISSN
0095-8956
1096-0902
Abstract
In a reduction sequence of a graph, vertices are successively identified until the graph has one vertex. At each step, when identifying u and v, each edge incident to exactly one of u and v is coloured red. Bonnet, Kim, Thomassé and Watrigant (2022) [19] defined the twin-width of a graph G to be the minimum integer k such that there is a reduction sequence of G in which every red graph has maximum degree at most k. For any graph parameter f, we define the reduced f of a graph G to be the minimum integer k such that there is a reduction sequence of G in which every red graph has f at most k. Our focus is on graph classes with bounded reduced bandwidth, which implies and is stronger than bounded twin-width (reduced maximum degree). We show that every proper minor-closed class has bounded reduced bandwidth, which is qualitatively stronger than an analogous result of Bonnet et al. for bounded twin-width. In many instances, we also make quantitative improvements. For example, all previous upper bounds on the twin-width of planar graphs were at least 21000. We show that planar graphs have reduced bandwidth at most 466 and twin-width at most 583. Our bounds for graphs of Euler genus γ are O(γ). Lastly, we show that fixed powers of graphs in a proper minor-closed class have bounded reduced bandwidth (irrespective of the degree of the vertices). In particular, we show that map graphs of Euler genus γ have reduced bandwidth O(γ4). Lastly, we separate twin-width and reduced bandwidth by showing that any infinite class of expanders excluding a fixed complete bipartite subgraph has unbounded reduced bandwidth, while there are bounded-degree expanders with twin-width at most 6.
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