An inverse result for the periodic boundary conditions
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Abstract
We obtain the classical Ambarzumyan's theorem for the Sturm-Liouville operator L with real-valued potential q ? L1[0, 1] and periodic boundary conditions when the subset of the spectrum of L and Fourier coecients ck of the potential q such that the condition holds are given. The same result holds for the anti-periodic boundary conditions.
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Keywords
Ambarzumyan theorem, inverse spectral theory, Hill operator, eigenvalue asymptotics
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Volume
19
Issue
2
Start Page
42
End Page
49
