English

Computational methods for finding bi-regular cages

Combinatorics 2024-11-27 v1 Discrete Mathematics

Abstract

An ({r,m};g)(\{r,m\};g)-graph is a (simple, undirected) graph of girth g3g\geq3 with vertices of degrees rr and mm where 2r<m2 \leq r < m . Given r,m,gr,m,g, we seek the ({r,m};g)(\{r,m\};g)-graphs of minimum order, called ({r,m};g)(\{r,m\};g)-cages or bi-regular cages, whose order is denoted by n({r,m};g)n(\{r,m\};g). In this paper, we use computational methods for finding ({r,m};g)(\{r,m\};g)-graphs of small order. Firstly, we present an exhaustive generation algorithm, which leads to \unicodex2013\unicode{x2013} previously unknown \unicodex2013\unicode{x2013} exhaustive lists of ({r,m};g)(\{r,m\};g)-cages for 24 different triples (r,m,g)(r,m,g). This also leads to the improvement of the lower bound of n({4,5};7)n(\{4,5\};7) from 66 to 69. Secondly, we improve 49 upper bounds of n({r,m};g)n(\{r,m\};g) based on constructions that start from rr-regular graphs. Lastly, we generalize a theorem by Aguilar, Araujo-Pardo and Berman [arXiv:2305.03290, 2023], leading to 73 additional improved upper bounds.

Keywords

Cite

@article{arxiv.2411.17351,
  title  = {Computational methods for finding bi-regular cages},
  author = {Jan Goedgebeur and Jorik Jooken and Tibo Van den Eede},
  journal= {arXiv preprint arXiv:2411.17351},
  year   = {2024}
}

Comments

26 pages

R2 v1 2026-06-28T20:13:03.542Z