English

On regular graphs with four distinct eigenvalues

Combinatorics 2016-11-16 v2

Abstract

Let G(4,2)\mathcal{G}(4,2) be the set of connected regular graphs with four distinct eigenvalues in which exactly two eigenvalues are simple, G(4,2,1)\mathcal{G}(4,2,-1) (resp. G(4,2,0)\mathcal{G}(4,2,0)) the set of graphs belonging to G(4,2)\mathcal{G}(4,2) with 1-1 (resp. 00) as an eigenvalue, and G(4,1)\mathcal{G}(4,\geq -1) the set of connected regular graphs with four distinct eigenvalues and second least eigenvalue not less than 1-1. In this paper, we prove the non-existence of connected graphs having four distinct eigenvalues in which at least three eigenvalues are simple, and determine all the graphs in G(4,2,1)\mathcal{G}(4,2,-1). As a by-product of this work, we characterize all the graphs belonging to G(4,1)\mathcal{G}(4,\geq-1) and G(4,2,0)\mathcal{G}(4,2,0), respectively, and show that all these graphs are determined by their spectra.

Keywords

Cite

@article{arxiv.1605.05421,
  title  = {On regular graphs with four distinct eigenvalues},
  author = {Xueyi Huang and Qiongxiang Huang},
  journal= {arXiv preprint arXiv:1605.05421},
  year   = {2016}
}

Comments

13 pages, 1 figure

R2 v1 2026-06-22T14:03:23.061Z