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Related Experiment Video

Updated: Apr 14, 2026

Detection of Architectural Distortion in Prior Mammograms via Analysis of Oriented Patterns
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Hamiltonian deformations of Gabor frames: First steps.

Maurice A de Gosson1

  • 1University of Vienna, Faculty of Mathematics, NuHAG, Austria.

Applied and Computational Harmonic Analysis
|April 21, 2015
PubMed
Summary

Gabor frames are redefined using Heisenberg-Weyl operators, simplifying known results and enabling a new deformation scheme. This research explores Hamiltonian deformation of Gabor frames using semiclassical physics, paving the way for a general deformation theory.

Keywords:
Coherent statesGabor frameHamiltonian isotopyMetaplectic groupSchrödinger equationSemiclassicalSymplectic group

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Area of Science:

  • Harmonic Analysis
  • Quantum Mechanics
  • Signal Processing

Background:

  • Gabor frames are fundamental in signal processing.
  • Existing methods for analyzing Gabor frames can be complex.
  • Harmonic analysis and quantum mechanics offer powerful mathematical tools.

Purpose of the Study:

  • To redefine Gabor frames using Heisenberg-Weyl operators.
  • To develop a general deformation scheme for Gabor frames.
  • To explore applications of Hamiltonian deformation in Gabor analysis.

Main Methods:

  • Utilizing Heisenberg-Weyl operators for Gabor frame redefinition.
  • Applying Hamiltonian isotopies for frame deformation.
  • Employing concepts from semiclassical physics, coherent states, and Gaussian approximations.

Main Results:

  • A simplified recovery of known symplectic covariance results for Gabor frames.
  • Introduction of a weak notion of Hamiltonian deformation for Gabor frames.
  • Demonstration of a novel approach to Gabor frame analysis and manipulation.

Conclusions:

  • The Heisenberg-Weyl operator redefinition offers a powerful and simple framework for Gabor frame analysis.
  • Hamiltonian deformation provides a new avenue for understanding and manipulating Gabor frames.
  • This work lays the foundation for a comprehensive deformation theory for Gabor frames with potential applications in various fields.