Inverse scattering in one dimension for a generalized Schrodinger equation
VAN DER MEE, CORNELIS VICTOR MARIA
1994-01-01
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.Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.