Non-real eigenvalues of the Harmonic Oscillator perturbed by an odd, two-point δ-potential
Abstract
In this paper, we consider the perturbations of the Harmonic Oscillator Operator by an odd pair of point interactions: z (δ(x - b) - δ(x + b)). We study the spectrum by analyzing a convenient formula for the eigenvalue. We conclude that if z = ir, r real, as r ∞, the number of non-real eigenvalues tends to infinity.
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