Inverse scattering in one dimension for a generalized Schrodinger equation

T. AKTOSUN;VAN DER MEE, CORNELIS VICTOR MARIA

1994-01-01

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Abstract

The generalized one-dimensional (d^2\psi/dx^2)+k^2H(x)^2\psi=Q(x)\psi is considered, where H(x)\to 1 and Q(x)\to 0 as x\to\pm\infty. The function H(x) is recovered when the scattering matrix, Q(x), the bound state energies and norming constants are known.