The wave equation with energy-dependent potentials. The linear case.
dc.contributor.author | R.J. Lombard | |
dc.contributor.author | M. Lassaut | |
dc.date.accessioned | 2017-05-03T09:37:02Z | |
dc.date.available | 2017-05-03T09:37:02Z | |
dc.date.issued | 2010-08-02 | |
dc.description.abstract | <p>The properties of the wave equation are studied in the case of energy-dependent potentials for discreet states. The non-linearity induced by the energy-dependence requires modifications of the standard rules of quantum mechanics. They are briefly recalled. We consider various radial shapes in the D = 3 dimensional space, assuming spherical symmetry and a linear energy dependence. This last is chosen because it produces a coherent theory.<br /> We present the effects of the energy dependence on the spectra of one-body and many-body systems. The most spectacular result is the saturation of the spectrum in the case of confining potentials : as the quantum number increase, the eigenvalues reach an upper limit. We deal with the question of the equivalent local potential. We discuss the role of the energy-dependence in critical situations, and show, for instance, that is regularized the -1/r2 potential.</p> | en |
dc.description.abstract | <p>The properties of the wave equation are studied in the case of energy-dependent potentials for discreet states. The non-linearity induced by the energy-dependence requires modifications of the standard rules of quantum mechanics. They are briefly recalled. We consider various radial shapes in the D = 3 dimensional space, assuming spherical symmetry and a linear energy dependence. This last is chosen because it produces a coherent theory.<br /> We present the effects of the energy dependence on the spectra of one-body and many-body systems. The most spectacular result is the saturation of the spectrum in the case of confining potentials : as the quantum number increase, the eigenvalues reach an upper limit. We deal with the question of the equivalent local potential. We discuss the role of the energy-dependence in critical situations, and show, for instance, that is regularized the -1/r2 potential.</p> | ar |
dc.identifier.uri | https://hdl.handle.net/20.500.11888/9580 | |
dc.title | The wave equation with energy-dependent potentials. The linear case. | en |
dc.title | The wave equation with energy-dependent potentials. The linear case. | ar |
dc.type | Other |
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