On the quantum-mechanical singular harmonic oscillator

Abstract

We obtain the eigenvalues and eigenfunctions of the singular harmonic oscillator V(x)=α/(2x2)+x2/2 by means of the simple and straightforward Frobenius (power-series) method. From the behaviour of the eigenfunctions at origin we derive two branches for the eigenvalues for negative values of α. We discuss the well known fact that there are square-integrable solutions only for some allowed discrete values of the energy.

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