English

Extending Thomassen's conjecture to directed graphs

Combinatorics 2025-10-14 v1

Abstract

A famous conjecture by Thomassen from 1983 asserts that for any given k,gNk,g\in \mathbb{N} there exists some d=d(k,g)Nd=d(k,g)\in \mathbb{N} such that every graph of minimum degree at least dd contains a subgraph of minimum degree at least kk and girth at least gg. In this paper, we initiate the systematic study of the directed analogs of Thomassen's conjecture one obtains when replacing minimum degree by minimum out-degree. Concretely, we study which digraphs FF are avoidable in the sense that there exists dF:NNd_F:\mathbb{N}\rightarrow \mathbb{N} such that every digraph of minimum out-degree at least dF(k)d_F(k) contains an FF-free subdigraph of minimum out-degree at least kk. Among our main results, we show that all orientations of C3C_3 and C5C_5 are avoidable, while one-directed orientations of complete bipartite graphs and all oriented trees are not avoidable. This, in particular, shows that the most direct extension of Thomassen's conjecture to digraphs is false. We also fully characterize which digraphs are avoidable when restricting the setting to regular host digraphs. Finally, we raise numerous attractive open problems in the hope of sparking further progress.

Keywords

Cite

@article{arxiv.2510.11311,
  title  = {Extending Thomassen's conjecture to directed graphs},
  author = {Micha Christoph and Barnabás Janzer and Kalina Petrova and Raphael Steiner},
  journal= {arXiv preprint arXiv:2510.11311},
  year   = {2025}
}

Comments

10 pages, 1 figure

R2 v1 2026-07-01T06:33:50.267Z