On the complex solution of the Schrödinger equation with exponential potentials

Abstract

Abstract We study the analytical solutions of the Schrödinger equation with a repulsive exponential potential λ e −r , and with an exponential wall λ e r , both with λ > 0. We show that the complex eigenenergies obtained for the latter tend either to those of the former, or to real rational numbers as λ → ∞ . In the light of these results, we explain the wrong resonance energies obtained in a previous application of the Riccati-Padé method to the Schrödinger equation with the repulsive exponential potential, and further study the convergence properties of this approach.