Inverse scattering in 1-D nonhomogeneous media and recovery of the wave speed

Virginia TechAktosun, T.Klaus, Martinvan der Mee, Cornelis2014-04-092014-04-091992-04Aktosun, T.; Klaus, M.; Vandermee, C., "Inverse scattering in 1-D nonhomogeneous media and recovery of the wave speed," J. Math. Phys. 33, 1395 (1992); http://dx.doi.org/10.1063/1.5297140022-2488http://hdl.handle.net/10919/47052The inverse scattering problem for the 1-D Schrodinger equation d2-psi/dx2 + k2-psi = k2P(x)psi + Q(x)psi is studied. This equation is equivalent to the 1-D wave equation with speed 1/ square-root 1 - P(x) in a nonhomogeneous medium where Q(x) acts as a restoring force. When Q(x) is integrable with a finite first moment, P(x) < 1 and bounded below and satisfies two integrability conditions, P(x) is recovered uniquely when the scattering data and Q(x) are known. Some explicitly solved examples are provided.en-USIn Copyrightinverse scatteringwave equationsInverse scattering in 1-D nonhomogeneous media and recovery of the wave speedArticle - Refereedhttp://scitation.aip.org/content/aip/journal/jmp/33/4/10.1063/1.529714Journal of Mathematical Physicshttps://doi.org/10.1063/1.529714