Ground states of classical magnetic dipole rings

Abstract

We investigate the two well-known ground states of rings of N classical magnetic dipoles that are given by clockwise or anti-clockwise spin orientations tangent to the circle encompassing the dipole ring. In particular, we formulate a rigorous proof of the ground state property of the states in question. The problem can be reduced to the determination of the lowest eigenvalue of a 3N× 3N matrix J. We show that all eigenvalues of J can be analytically calculated and, at least for N=3,…,8, the lowest one can be directly determined. The main part of the paper is devoted to the completion of the proof for N 9 based on various estimates and case distinctions. We also discuss the question to what extent computer-algebraic results should be allowed to contribute to a mathematical proof.