Sparse Gabor representations of metaplectic operators: controlled exponential decay and Schr\"odinger confinement

TL;DR

This paper studies how metaplectic operators can be approximately diagonalized using localized Gabor wave packets, providing exponential decay bounds and analyzing dispersive phenomena relevant to Schrödinger evolution.

Contribution

It introduces new quantitative bounds for matrix coefficients of metaplectic operators in Gabor frames and generalizes Gaussian confinement results for quantum harmonic oscillators.

Findings

Established exponential decay rates for matrix coefficients.

Analyzed dispersive and spreading phenomena in phase space.

Extended Gaussian confinement results to broader settings.

Abstract

Motivated by the phase space analysis of Schr\"odinger evolution operators, in this paper we investigate how metaplectic operators are approximately diagonalized along the corresponding symplectic flows by exponentially localized Gabor wave packets. Quantitative bounds for the matrix coefficients arising in the Gabor wave packet decomposition of such operators are established, revealing precise exponential decay rates together with subtler dispersive and spreading phenomena. To this aim, we present several novel results concerning the time-frequency analysis of functions with controlled Gelfand-Shilov regularity, which are of independent interest. As a byproduct, we generalize Vemuri's Gaussian confinement results for the solutions of the quantum harmonic oscillator in two respects, namely by encompassing general exponential decay rates as well as arbitrary quadratic Schr\"odinger propagators. In particular, we extensively discuss some prominent models such as the harmonic oscillator, the free particle in a constant magnetic field and fractional Fourier transforms.