Matrix Zakharov-Shabat Systems with Zero Diagonal Entry
Abstract
In this article we develop the direct and inverse scattering theory of the Ablowitz-Kaup-Newell-Segur (AKNS) system x=(ik+(x)), where is a diagonal n× n matrix with diagonal entries 1 and -1 and a single zero diagonal entry and (x) is an n× n potential anticommuting with with entries in L1(). We derive the time evolution of the scattering data which, through the inverse scattering transform, lead to the solution of the initial-value problem for a system of long-wave-short-wave equations.
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