In this note we provide an alternative way of defining the self-adjoint Hamiltonian of the harmonic oscillator perturbed by an attractive $\delta ^{\prime} $- interaction, of strength $\beta $, centred at 0 (the bottom of the confining parabolic potential), that was rigorously defined in a previous paper by means of a 'coupling constant renormalisation'. Here we get the Hamiltonian as a norm resolvent limit of the harmonic oscillator Hamiltonian perturbed by a triple of attractive $\delta $-interactions, thus extending the Cheon–Shigehara approximation to the case in which a confining harmonic potential is present.
The Hamiltonian of the harmonic oscillator with an attractive δ′-interaction centred at the origin as approximated by the one with a triple of attractive δ-interactions
Rinaldi F;
2015-01-01
Abstract
In this note we provide an alternative way of defining the self-adjoint Hamiltonian of the harmonic oscillator perturbed by an attractive $\delta ^{\prime} $- interaction, of strength $\beta $, centred at 0 (the bottom of the confining parabolic potential), that was rigorously defined in a previous paper by means of a 'coupling constant renormalisation'. Here we get the Hamiltonian as a norm resolvent limit of the harmonic oscillator Hamiltonian perturbed by a triple of attractive $\delta $-interactions, thus extending the Cheon–Shigehara approximation to the case in which a confining harmonic potential is present.File in questo prodotto:
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