The spectrum of the cubic oscillator

Abstract

We prove the simplicity and analyticity of the eigenvalues of the cubic oscillator Hamiltonian,H(β)=-d2/dx2+x2+iβx3,for β in the cut plane c:= (-∞, 0). Moreover, we prove that the spectrum consists of the perturbative eigenvalues \En(β)\n≥ 0 labeled by the constant number n of nodes of the corresponding eigenfunctions. In addition, for all β∈c, En(β) can be computed as the Stieltjes-Pad\'e sum of its perturbation series at β=0. This also gives an alternative proof of the fact that the spectrum of H(β) is real when β is a positive number. This way, the main results on the repulsive PT-symmetric and on the attractive quartic oscillators are extended to the cubic case.