arXiv:2304.12710 Abstract | arXiv Analytics

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Rotation $r$-graphs

Published 2023-04-25Version 1

We study rotation $r$-graphs and show that for every $r$-graph $G$ of odd regularity there is a simple rotation $r$-graph $G'$ such that $G$ can be obtained form $G'$ by a finite number of $2$-cut reductions. As a consequence, some hard conjectures as the (generalized) Berge-Fulkerson Conjecture and Tutte's 3- and 5-flow conjecture can be reduced to rotation $r$-graphs.

Comments: 9 pages

Journal: Discrete Mathematics (2023)

DOI: 10.1016/j.disc.2023.113457

Categories: math.CO

Keywords: finite number, study rotation, odd regularity, berge-fulkerson conjecture, hard conjectures

Tags: journal article

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