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Classifying cubic symmetric graphs of order 18p2

Authors

Mehdi Alaeiyan Iran University of Science and Technology
Mohammad Kazem Hosseinipoor Iran University of Science and Technology
Masoumeh Akbarizadeh Iran University of Science and Technology

DOI:

https://doi.org/10.52737/18291163-2020.12.1-1-11

Keywords:

Symmetric graphs, $s$-regular graphs regular coverings

Abstract

A $s$-arc in a graph is an ordered $(s+1)$-tuple $(v_{0}, v_{1}, \cdots, v_{s-1}, v_{s})$ of vertices such that $v_{i-1}$ is adjacent to $v_{i}$ for $1\leq i \leq s$ and $v_{i-1}\neq v_{i+1}$ for $1\leq i < s$. A graph $X$ is called $s$-regular if its automorphism group acts regularly on the set of its $s$-arcs. In this paper, we classify all connected cubic $s$-regular graphs of order $18p^2$ for each $s\geq1$ and each prime $p$.

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Published

2020-03-28

Versions

2022-08-28 (2)
2020-03-28 (1)

Issue

Vol. 12 No. 1 (2020): Classifying cubic symmetric graphs of order $18p^2$

Section

Articles

How to Cite

Classifying cubic symmetric graphs of order 18p2. (2020). Armenian Journal of Mathematics, 12(1), 1-11. https://armjmath.sci.am/index.php/ajm/article/view/305