Marchenko Equations and Norming Constants of the Matrix Zakharov–shabat System
نویسنده
چکیده
In this article we derive the Marchenko integral equations for solving the inverse scattering problem for the matrix Zakharov-Shabat system with a potential without symmetry properties and having L1 entries under a technical hypothesis preventing the accumulation of discrete eigenvalues on the continuous spectrum. Wederive additional symmetry properties in the focusing case. The norming constant matrices appearing as parameter matrices in the Marchenko integral kernels are defined and studied without making any assumptions on the Jordan structure of the matrix Zakharov-Shabat Hamiltonian at the discrete eigenvalues.
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