The maximal energy of classes of integral circulant graphs

TL;DR

This paper investigates the maximum energy of integral circulant graphs with a fixed number of vertices and divisor set size, revealing specific balance conditions on divisor exponents that optimize graph energy.

Contribution

It characterizes the divisor exponent configurations that maximize the energy of integral circulant graphs for prime power vertices, providing explicit formulas.

Findings

Maximal energy configurations follow specific balanced difference patterns.

Explicit formulas for maximum energy are derived for certain parameters.

Balance conditions involve uniform or nearly uniform differences between exponents.

Abstract

The energy of a graph is the sum of the moduli of the eigenvalues of its adjacency matrix. We study the energy of integral circulant graphs, also called gcd graphs, which can be characterized by their vertex count $n$ and a set $\cal D$ of divisors of $n$ in such a way that they have vertex set $\mathbb{Z}_n$ and edge set ${{a,b}: a,b\in\mathbb{Z}_n, \gcd(a-b,n)\in {\cal D}}$. For a fixed prime power $n=p^s$ and a fixed divisor set size $|{\cal D}| =r$, we analyze the maximal energy among all matching integral circulant graphs. Let $p^{a_1} < p^{a_2} < ... < p^{a_r}$ be the elements of ${\cal D}$. It turns out that the differences $d_i=a_{i+1}-a_{i}$ between the exponents of an energy maximal divisor set must satisfy certain balance conditions: (i) either all $d_i$ equal $q:=\frac{s-1}{r-1}$, or at most the two differences $[q]$ and $[q+1]$ may occur; %(for a certain $d$ depending on $r$ and $s$) (ii) there are rules governing the sequence $d_1,...,d_{r-1}$ of consecutive differences. For particular choices of $s$ and $r$ these conditions already guarantee maximal energy and its value can be computed explicitly.