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The semi-classical scattering matrix from the point of view of Gaussian states

Published 20 Dec 2016 in math.AP, math-ph, math.MP, and math.SP | (1612.06783v3)

Abstract: In this note, we will consider semiclassical scattering for compactly supported non-trapping perturbations of the Laplacian on $\mathbb{R}d$. We will define a family of Gaussian states on $\mathbb{S}{d-1}$, parametrized by points in $T*\mathbb{S}{d-1}$, and show that the action of the scattering matrix on a Gaussian state of parameter $\rho\in T*\mathbb{S}{d-1}$ is still a Gaussian state, with parameter $\kappa(\rho)$, where $\kappa$ is the (classical) scattering map. This is one way of saying that \emph{the scattering matrix quantizes the scattering map}, complementary to a previous result of Alexandrova in terms of Fourier Integral Operators.

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