Inverse spectral problems for Dirac operator with eigenvalue dependent boundary and jump conditions
Abstract
We deal with the Dirac operator with eigenvalue dependent boundary and jump conditions. Properties of eigenvalues, eigenfunctions and the resolvent operator are studied. Moreover, uniqueness theorems of the inverse problem according to the Weyl functions and the spectral data (the sets of eigenvalues and norming constants; two different eigenvalues sets) are proved.
Source
ACTA MATHEMATICA HUNGARICAVolume
130Issue
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