Related papers: Study on a Quantization Condition and the Solvability of Schrödinger-type Equations

Study on a Quantization Condition and the Solvability of Schrödinger-type Equations

URL: http://arxiv.org/abs/2403.20217v1
Date: Fri, 29 Mar 2024 14:56:34 GMT
Title: Study on a Quantization Condition and the Solvability of Schrödinger-type Equations
Authors: Yuta Nasuda,
Abstract summary: We study a quantization condition in relation to the solvability of Schr"odinger equations. The SWKB quantization condition provides quantizations of energy. We show explicit solutions of the Schr"odinger equations with the classical-orthogonal-polynomially quasi-exactly solvable potentials.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: In this thesis, we study a quantization condition in relation to the solvability of Schr\"{o}dinger equations. This quantization condition is called the SWKB (supersymmetric Wentzel-Kramers-Brillouin) quantization condition and has been known in the context of supersymmetric quantum mechanics for decades. The main contents of this thesis are recapitulated as follows: the foundation and the application of the SWKB quantization condition. The first half of this thesis aims to understand the fundamental implications of this condition based on extensive case studies. It turns out that the exactness of the SWKB quantization condition indicates the exact solvability of a system via the classical orthogonal polynomials. The SWKB quantization condition provides quantizations of energy, which we call the direct problem of the SWKB. We formulate the inverse problem of the SWKB: the problem of determining the superpotential from a given energy spectrum. The formulation successfully reconstructs all conventional shape-invariant potentials from the given energy spectra. We further construct novel solvable potentials, which are classical-orthogonal-polynomially quasi-exactly solvable, by this formulation. We further demonstrate several explicit solutions of the Schr\"{o}dinger equations with the classical-orthogonal-polynomially quasi-exactly solvable potentials, whose family is referred to as a harmonic oscillator with singularity functions in this thesis. In one case, the energy spectra become isospectral, with several additional eigenstates, to the ordinary harmonic oscillator for special choices of a parameter. By virtue of this, we formulate a systematic way of constructing infinitely many potentials that are strictly isospectral to the ordinary harmonic oscillator.

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