English

Long induced paths in minor-closed graph classes and beyond

Discrete Mathematics 2023-01-04 v2 Combinatorics

Abstract

In this paper we show that every graph of pathwidth less than kk that has a path of order nn also has an induced path of order at least 13n1/k\frac{1}{3} n^{1/k}. This is an exponential improvement and a generalization of the polylogarithmic bounds obtained by Esperet, Lemoine and Maffray (2016) for interval graphs of bounded clique number. We complement this result with an upper-bound. This result is then used to prove the two following generalizations: - every graph of treewidth less than kk that has a path of order nn contains an induced path of order at least 14(logn)1/k\frac{1}{4} (\log n)^{1/k}; - for every non-trivial graph class that is closed under topological minors there is a constant d(0,1)d \in (0,1) such that every graph from this class that has a path of order nn contains an induced path of order at least (logn)d(\log n)^d. We also describe consequences of these results beyond graph classes that are closed under topological minors.

Keywords

Cite

@article{arxiv.2201.03880,
  title  = {Long induced paths in minor-closed graph classes and beyond},
  author = {Claire Hilaire and Jean-Florent Raymond},
  journal= {arXiv preprint arXiv:2201.03880},
  year   = {2023}
}

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Final version

R2 v1 2026-06-24T08:46:15.140Z