On critical points of eigenvalues of the Montgomery family of quartic oscillators

Abstract

We discuss spectral properties of the family of quartic oscillators h M(α) =-d2dt2 +(12 t2 -α)2 on the real line, where α∈ R is a parameter. This operator appears in a variety of applications coming from quantum mechanics to harmonic analysis on Lie groups, Riemannian geometry and superconductivity. We study the variations of the eigenvalues λj(α) of h M(α) as functions of the parameter α.We prove that for j sufficiently large, α λj(α) has a unique critical point, which is a nondegenerate minimum.We also prove that the first eigenvalue λ1(α) enjoys the same property and give a numerically assisted proof that the same holds for the second eigenvalue λ2(α). The proof for excited states relies on a semiclassical reformulation of the problem. In particular, we develop a method permitting to differentiate with respect to the semiclassical parameter, which may be of independent interest.