Direct and inverse spectral continuity for Dirac operators
Abstract
The half-line Dirac operators with L2-potentials can be characterized by their spectral data. It is known that the spectral correspondence is a homeomorphism: close potentials give rise to close spectral data and vice versa. We prove the first explicit two-sided uniform estimate related to this continuity in the general L2-case. The proof is based on an exact solution of the inverse spectral problem for Dirac operators with δ-interactions on a half-lattice in terms of the Schur's algorithm for analytic functions.
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