English

Pancyclicity when each cycle contains k chords

Combinatorics 2017-10-30 v2

Abstract

For integers nk2n \geq k \geq 2, let c(n,k)c(n,k) be the minimum number of chords that must be added to a cycle of length nn so that the resulting graph has the property that for every l{k,k+1,,n}l \in \{ k , k + 1 , \dots , n \}, there is a cycle of length ll that contains exactly kk of the added chords. Affif Chaouche, Rutherford, and Whitty introduced the function c(n,k)c(n,k). They showed that for every integer k2k \geq 2, c(n,k)Ωk(n1/k)c(n , k ) \geq \Omega_k ( n^{1/k} ) and they asked if n1/kn^{1/k} gives the correct order of magnitude of c(n,k)c(n, k) for k2k \geq 2. Our main theorem answers this question as we prove that for every integer k2k \geq 2, and for sufficiently large nn, c(n,k)kn1/k+k2c(n , k) \leq k \lceil n^{1/k} \rceil + k^2. This upper bound, together with the lower bound of Affif Chaouche et.\ al., shows that the order of magnitude of c(n,k)c(n,k) is n1/kn^{1/k}.

Keywords

Cite

@article{arxiv.1612.08802,
  title  = {Pancyclicity when each cycle contains k chords},
  author = {Vladislav Taranchuk},
  journal= {arXiv preprint arXiv:1612.08802},
  year   = {2017}
}

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13 Pages

R2 v1 2026-06-22T17:35:40.150Z