Graph Energy Maximisation for Integral Circulant Graphs of Order n = p2q3

Abstract

The energy of a graph is the sum of the absolute values of its adjacency eigenvalues. For integral circulant graphs (n,D) of order n=p2q3, where p and q are distinct odd primes, we prove that the adjacency eigenvalues of (p2q3,), for the divisor set =\1,p2,pq,q2,p2q2,pq3\, admit an exact Kronecker factorisation in the prime exponents: they separate completely into a factor depending only on p and a factor depending only on~q. This factorisation holds unconditionally for all pairs of distinct odd primes and constitutes the structural core of the paper. From it we derive, unconditionally, the first closed-form polynomial formula for the energy of a two-prime-order integral circulant graph evaluated at . Exhaustive computation over prime pairs (p,q) confirms that is the unique energy maximiser in every tested case; we conjecture that this universality holds for all pairs of distinct odd primes.