Anharmonic Oscillators with Infinitely Many Real Eigenvalues and PT-Symmetry

Abstract

We study the eigenvalue problem -u"+V(z)u=λ u in the complex plane with the boundary condition that u(z) decays to zero as z tends to infinity along the two rays z=-π2 2πm+2, where V(z)=-(iz)m-P(iz) for complex-valued polynomials P of degree at most m-1≥ 2. We provide an asymptotic formula for eigenvalues and a necessary and sufficient condition for the anharmonic oscillator to have infinitely many real eigenvalues.