Inverse spectral problems for Dirac operator with eigenvalue dependent boundary and jump conditions (Q653778)
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scientific article; zbMATH DE number 5990535
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Inverse spectral problems for Dirac operator with eigenvalue dependent boundary and jump conditions |
scientific article; zbMATH DE number 5990535 |
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Inverse spectral problems for Dirac operator with eigenvalue dependent boundary and jump conditions (English)
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19 December 2011
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The classical Dirac system on a finite interval is considered with jump conditions inside the interval and with boundary conditions linearly depending on the spectral parameter. The inverse spectral problem of recovering the system from the so-called Weyl function is investigated. The uniqueness theorem for this inverse problem is formulated. This theorem also gives uniqueness results under discrete spectral data.
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Dirac operator
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spectrum
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inverse problem
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jump condition
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0.9752979
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0.9451998
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0.9418535
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0.93660474
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0.9359354
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0.9311646
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0.9310591
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0.93053275
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