2006
DOI: 10.1017/s0013091504000859
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Inverse Spectral Problems for Sturm–liouville Operators With Singular Potentials. Iv. Potentials in the Sobolev Space Scale

Abstract: We solve the inverse spectral problems for the class of Sturm-Liouville operators with singular real-valued potentials from the Sobolev space WThe potential is recovered from two spectra or from one spectrum and the norming constants. Necessary and sufficient conditions for the spectral data to correspond to a potential in W s−1 2 (0, 1) are established.

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Cited by 37 publications
(38 citation statements)
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“…The present authors [45] introduced the scale of spaces l α+1 B for studying the spectral data of Borg's problem and analyzed the problem in terms of these spaces for all smoothness indices α −1. Hryniv and Mykytyuk [23] used different terms and a different method to study Borg's problem and also the inverse problem with given spectral function for smoothness indices α ∈ [−1, 0].…”
mentioning
confidence: 99%
“…The present authors [45] introduced the scale of spaces l α+1 B for studying the spectral data of Borg's problem and analyzed the problem in terms of these spaces for all smoothness indices α −1. Hryniv and Mykytyuk [23] used different terms and a different method to study Borg's problem and also the inverse problem with given spectral function for smoothness indices α ∈ [−1, 0].…”
mentioning
confidence: 99%
“…The essential step towards such project is to derive eigenvalue asymptotics for Sturm-Liouville operators with potentials in W α−1 2 (0, 1)-i.e., to treat the direct spectral problem. And indeed, based on the results obtained here, we completely solve the inverse spectral problem for SturmLiouville operators with potentials in the scale W α−1 2 (0, 1), α ∈ [0, 1], in our paper [17]. Another motivation for this work is the recent papers [18,31], where similar questions are considered.…”
Section: Introductionmentioning
confidence: 83%
“…Similar characterization of the set SD is available if p and r belong to W s 2 (0, 1) with s ≥ 0; cf. the results of [17,48] on eigenvalue asymptotics for Sturm-Liouville operators with potentials in Sobolev spaces. Secondly, the approach described is not restricted to the Dirichlet boundary conditions and can be used to reconstruct energy-dependent Sturm-Liouville equations under quite general separated boundary conditions.…”
Section: Reconstruction Of the Pencil: Uniquenessmentioning
confidence: 99%