Pancyclicity when each cycle contains k chords
Combinatorics
2017-10-30 v2
Abstract
For integers , let be the minimum number of chords that must be added to a cycle of length so that the resulting graph has the property that for every , there is a cycle of length that contains exactly of the added chords. Affif Chaouche, Rutherford, and Whitty introduced the function . They showed that for every integer , and they asked if gives the correct order of magnitude of for . Our main theorem answers this question as we prove that for every integer , and for sufficiently large , . This upper bound, together with the lower bound of Affif Chaouche et.\ al., shows that the order of magnitude of is .
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