WKB Analysis of PT-Symmetric Sturm-Liouville problems. II

Abstract

In a previous paper it was shown that a one-turning-point WKB approximation gives an accurate picture of the spectrum of certain non-Hermitian PT-symmetric Hamiltonians on a finite interval with Dirichlet boundary conditions. Potentials to which this analysis applies include the linear potential V=igx and the sinusoidal potential V=ig(α x). However, the one-turning-point analysis fails to give the full structure of the spectrum for the cubic potential V=igx3, and in particular it fails to reproduce the critical points at which two real eigenvalues merge and become a complex-conjugate pair. The present paper extends the method to cases where the WKB path goes through a pair of turning points. The extended method gives an extremely accurate approximation to the spectrum of V=igx3, and more generally it works for potentials of the form V=igx2N+1. When applied to potentials with half-integral powers of x, the method again works well for one sign of the coupling, namely that for which the turning points lie on the first sheet in the lower-half plane.