In this paper we investigate the exactness of the WKB quantization condition for translationally shape invariant systems. In particular, using the formalism of supersymmetric quantum mechanics, we generalize the Langer correction and show that it generates the exact quantization condition for all conventional potentials.Comment: 24 pages, no figure
We review solvable models within the framework of supersymmetric quantum mechanics (SUSYQM). In SUSY...
Based on the standard transfer matrix, a formally exact quantization condition for arbitrary potenti...
Quantum Hamilton-Jacobi Theory and supersymmetric quantum mechanics (SUSYQM) are two parallel method...
Following the verification of the conjecture made by Comtet et al that the supersymmetry-inspired se...
I show that unlike the standard lowest order WKB, the supersymmetry-inspired WKB quantization co...
The semiclassical WKB approximation method is reexamined in the context of nonrelativistic quantum-m...
In the framework of the recently proposed supersymmetric WKB (SWKB) approximation scheme, we obtain ...
Quantum deformed potentials arise naturally in quantum mechanical systems of one bosonic coordinate ...
The supersymmetry-inspired WKB approximation (SWKB) in quantum mechanics is discussed in detail. The...
For one-dimensional power-like potentials $|x|^m, m > 0$ the Bohr-Sommerfeld Energies (BSE) extracte...
The semiclassical WKB approximation method is reexamined in the context of nonrelativistic quantum-m...
Using supersymmetric quantum mechanics, one can obtain analytic expressions for the eigenvalues and ...
We construct a double degenerate supersymmetry in one dimensional quantum mechanics. Here the energy...
We study the accuracy of several alternative semiclassical methods by computing analytically the ene...
Abstract. An elementary introduction is given to the subject of supersymmetry in quantum me-chanics ...
We review solvable models within the framework of supersymmetric quantum mechanics (SUSYQM). In SUSY...
Based on the standard transfer matrix, a formally exact quantization condition for arbitrary potenti...
Quantum Hamilton-Jacobi Theory and supersymmetric quantum mechanics (SUSYQM) are two parallel method...
Following the verification of the conjecture made by Comtet et al that the supersymmetry-inspired se...
I show that unlike the standard lowest order WKB, the supersymmetry-inspired WKB quantization co...
The semiclassical WKB approximation method is reexamined in the context of nonrelativistic quantum-m...
In the framework of the recently proposed supersymmetric WKB (SWKB) approximation scheme, we obtain ...
Quantum deformed potentials arise naturally in quantum mechanical systems of one bosonic coordinate ...
The supersymmetry-inspired WKB approximation (SWKB) in quantum mechanics is discussed in detail. The...
For one-dimensional power-like potentials $|x|^m, m > 0$ the Bohr-Sommerfeld Energies (BSE) extracte...
The semiclassical WKB approximation method is reexamined in the context of nonrelativistic quantum-m...
Using supersymmetric quantum mechanics, one can obtain analytic expressions for the eigenvalues and ...
We construct a double degenerate supersymmetry in one dimensional quantum mechanics. Here the energy...
We study the accuracy of several alternative semiclassical methods by computing analytically the ene...
Abstract. An elementary introduction is given to the subject of supersymmetry in quantum me-chanics ...
We review solvable models within the framework of supersymmetric quantum mechanics (SUSYQM). In SUSY...
Based on the standard transfer matrix, a formally exact quantization condition for arbitrary potenti...
Quantum Hamilton-Jacobi Theory and supersymmetric quantum mechanics (SUSYQM) are two parallel method...
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