A classification of all 1-Salem graphs

TL;DR

This paper provides a complete classification of all 1-Salem graphs, which are a specific class of graphs with spectral properties close to cyclotomic graphs, including 26 infinite families and 383 sporadic examples.

Contribution

It offers the first comprehensive combinatorial classification of all 1-Salem graphs, identifying their structure and enumerating all instances.

Findings

26 infinite families of 1-Salem graphs identified

383 sporadic 1-Salem graphs enumerated

Complete combinatorial description provided

Abstract

One way to study certain classes of polynomials is by considering examples that are attached to combinatorial objects. Any graph $G$ has an associated reciprocal polynomial $R_G$, and with two particular classes of reciprocal polynomials in mind one can ask the questions: (a) when is $R_G$ a product of cyclotomic polynomials (giving the cyclotomic graphs)? (b) when does $R_G$ have the minimal polynomial of a Salem number as its only non-cyclotomic factor (the non-trival Salem graphs)? Cyclotomic graphs were classified by Smith in 1970. Salem graphs are `spectrally close' to being cyclotomic, in that nearly all their eigenvalues are in the critical interval [-2,2]. On the other hand Salem graphs do not need to be `combinatorially close' to being cyclotomic: the largest cyclotomic induced subgraph might be comparatively tiny. We define an $m$-Salem graph to be a connected Salem graph $G$ for which $m$ is minimal such that there exists an induced cyclotomic subgraph of $G$ that has $m$ fewer vertices than $G$. The 1-Salem subgraphs are both spectrally close and combinatorially close to being cyclotomic. Moreover, every Salem graph contains a 1-Salem graph as an induced subgraph, so these 1-Salem graphs provide some necessary substructure of all Salem graphs. The main result of this paper is a complete combinatorial description of all 1-Salem graphs: there are 26 infinite families and 383 sporadic examples.