Gabor Frames of Gaussian Beams for the Schr\"odinger equation

Abstract

The present paper is devoted to the semiclassical analysis of linear Schr\"odinger equations from a Gabor frame perspective. We consider (time-dependent) smooth Hamiltonians with at most quadratic growth. Then we construct higher order parametrices for the corresponding Schr\"odinger equations by means of -Gabor frames, as recently defined by M. de Gosson, and we provide precise L2-estimates of their accuracy, in terms of the Planck constant . Nonlinear parametrices, in the spirit of the nonlinear approximation, are also presented. Numerical experiments are exhibited to compare our results with the early literature.