We perform a time-frequency analysis of Fourier multipliers and, more generally, pseudodifferential operators with symbols of Gevrey, analytic and ultra-analytic type. As an application we show that Gabor frames, which provide optimally sparse decompositions for Schr\"odinger-type propagators \cite{fio3}, reveal to be an equally efficient tool for representing solutions to hyperbolic and parabolic-type differential equations with constant coefficients. In fact, the Gabor matrix representation of the corresponding propagator displays super-exponential decay away from the diagonal.
Gabor Representations of evolution operators
CORDERO, Elena;RODINO, Luigi Giacomo
2015-01-01
Abstract
We perform a time-frequency analysis of Fourier multipliers and, more generally, pseudodifferential operators with symbols of Gevrey, analytic and ultra-analytic type. As an application we show that Gabor frames, which provide optimally sparse decompositions for Schr\"odinger-type propagators \cite{fio3}, reveal to be an equally efficient tool for representing solutions to hyperbolic and parabolic-type differential equations with constant coefficients. In fact, the Gabor matrix representation of the corresponding propagator displays super-exponential decay away from the diagonal.
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