Low-energy chain of resonances for three-dimensional Schrödinger operator with nearly Coulomb potential (Q1338301)
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scientific article; zbMATH DE number 696885
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Low-energy chain of resonances for three-dimensional Schrödinger operator with nearly Coulomb potential |
scientific article; zbMATH DE number 696885 |
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Low-energy chain of resonances for three-dimensional Schrödinger operator with nearly Coulomb potential (English)
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29 November 1994
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The author considers the radial Schrödinger equation when the Coulomb potential is perturbed by a compactly supported nonnegative potential with a finite and positive first moment. It is shown that there exists a set of resonances [\textit{R. G. Newton}, Scattering theory of waves and particles, 2nd, ed., Springer-Verlag, New York (1982; Zbl 0496.47011)] converging to zero. The result is obtained by studying the low energy behavior of the Jost functions corresponding to different angular momenta and by using the author's earlier result [J. Math. Anal. Appl. 181, No. 3, 600-625 (1994)].
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radial Schrödinger equation
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Coulomb potential
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Jost functions
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0.88049805
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0.8752933
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0.87060153
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0.8522716
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0.84954226
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0.8465634
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