Adiabatic Series Expansion and Higher-Order Semiclassical Approximations in Scattering Theory

Abstract

The scattering properties of any complex scattering potential, v:R -> C, can be obtained from the dynamics of a particular non-unitary two-level quantum system Sv. The application of the adiabatic approximation to Sv yields a semiclassical treatment of the scattering problem. We examine the adiabatic series expansion for the evolution operator of Sv and use it to obtain corrections of arbitrary order to the semiclassical formula for the transfer matrix of v. This results in a high-energy approximation scheme that unlike the semiclassical approximation can be applied for potentials with large derivatives.