The spectrum of a Harmonic Oscillator Operator Perturbed by Point Interactions

Abstract

We consider the operator L = - (d/dx)2 + x2 y + w(x) y , y ∈ L2(R) , where w(x) = s [ δ(x - b) - δ(x + b)], b ≠ 0, real, s ∈ C. This operator has a discrete spectrum: eventually the eigenvalues are simple and λn = (2n + 1) + s2 ((n) / n) + (n), where (n) = 12π [(-1)n + 1 ( 2 b 2n ) - 12 ( 4 b 2n ) ] and |(n) | ≤ C ( n) / (n3/2) If s = i γ, γ real, the number T(γ) of non-real eigenvalues is finite, and T(γ) ≤ [ C (1 + | γ |) (e + | γ |)]2. The analogue of the above equations is given in the case of any two-point interaction perturbation w(x) = c+ δ(x - b) + c- δ(x + b), c+, c- ∈ C.