Cycles with almost linearly many chords

Nemanja Dragani\'c; Ant\'onio Gir\~ao

arXiv:2601.08769·math.CO·January 14, 2026

Cycles with almost linearly many chords

Nemanja Dragani\'c, Ant\'onio Gir\~ao

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Abstract

We prove that constant minimum degree already forces cycles with almost linearly many chords. Specifically, every graph $G$ with $δ (G) \geq C$ contains a cycle of length $ℓ \geq 4$ with $Ω (ℓ / lo g^{C} ℓ)$ chords for some absolute constant $C > 0$ . This is the first result showing that a constant-degree condition yields an unbounded -- indeed nearly linear -- number of chords, placing our bound within a polylogarithmic factor of the Chen--Erd\H{o}s--Staton conjecture. It also gives a strong affirmative conclusion in the direction of a recent question of Dvo\v{r}\'ak, Martins, Thomass\'e, and Trotignon asking whether constant-degree graphs must contain cycles whose chord counts grow with their length.

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Taxonomy

TopicsLimits and Structures in Graph Theory · Advanced Combinatorial Mathematics · Advanced Graph Theory Research