Analyticity and uniform stability of the inverse singular Sturm--Liouville spectral problem
Abstract
We prove that the potential of a Sturm--Liouville operator depends analytically and Lipschitz continuously on the spectral data (two spectra or one spectrum and the corresponding norming constants). We treat the class of operators with real-valued distributional potentials in the Sobolev class Ws-12(0,1), s∈[0,1].
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