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Quasilinear Approximation and WKB
Quasilinear solutions of the radial Schrodinger equation for different potentials are compared with corresponding WKB solutions. For this study, the Schrodinger equation is first cast into a nonlinear Riccati form. While the WKB method generates an expansion in powers of h-bar, the quasi-linearizati...
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| Published in: | Few-body systems 2004-05, Vol.34 (1-3), p.57 |
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| Main Authors: | , , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that cite this one |
| Online Access: | Get full text |
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| Summary: | Quasilinear solutions of the radial Schrodinger equation for different potentials are compared with corresponding WKB solutions. For this study, the Schrodinger equation is first cast into a nonlinear Riccati form. While the WKB method generates an expansion in powers of h-bar, the quasi-linearization method (QLM) approaches the solution of the Riccati equation by approximating its nonlinear terms by a sequence of linear iterates. Although iterative, the QLM is not perturbative and does not rely on the existence of any kind of smallness parameters. If the initial QLM guess is properly chosen, the usual QLM solution, unlike the WKB, displays no unphysical turning-point singularities. The first QLM iteration is given by an analytic expression. This allows one to estimate analytically the role of different parameters, and the influence of their variation on the boundedness or unboundedness of a critically stable quantum system, with much more precision than provided by the WKB approximation, which often fails miserably for systems on the border of stability. It is therefore demonstrated that the QLM method is preferable over the usual WKB method. [PUBLICATION ABSTRACT] |
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| ISSN: | 0177-7963 1432-5411 |
| DOI: | 10.1007/s00601-004-0045-3 |