On the Continuity of $$\tau $$-Wigner Pseudodifferential Operators
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Publication:5230195
DOI10.1007/978-3-030-05210-2_6OpenAlexW2913502285MaRDI QIDQ5230195
Publication date: 21 August 2019
Published in: Landscapes of Time-Frequency Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-030-05210-2_6
modulation spacesWiener amalgam spaces\(\tau \)-pseudodifferential operators\(\tau \)-Wigner distribution
Pseudodifferential operators as generalizations of partial differential operators (35S05) Function spaces arising in harmonic analysis (42B35) Phase-space methods including Wigner distributions, etc. applied to problems in quantum mechanics (81S30) Pseudodifferential operators (47G30)
Cites Work
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- Schrödinger equations with rough Hamiltonians
- On the invertibility of Born-Jordan quantization
- Continuity and Schatten-von Neumann properties for localization operators on modulation spaces
- Time-frequency analysis of Born-Jordan pseudodifferential operators
- Sharp results for the Weyl product on modulation spaces
- Reconstruction of singularities for solutions of Schrödinger equations
- Sharp continuity results for the short-time Fourier transform and for localization operators
- Exponentially sparse representations of Fourier integral operators
- Multilinear localization operators
- The analysis of linear partial differential operators. III: Pseudo-differential operators
- Time-frequency analysis of Sjöstrand's class
- Unimodular Fourier multipliers for modulation spaces
- Integral representations for the class of generalized metaplectic operators
- Boundedness properties of pseudo-differential and Calderón--Zygmund operators on modulation spaces
- Time-frequency analysis of Fourier integral operators
- Boundedness of Schrödinger type propagators on modulation spaces
- Sparsity of Gabor representation of Schrödinger propagators
- On compactness of commutators of multiplications and convolutions, and boundedness of pseudodifferential operators
- Boundedness of some pseudodifferential operators
- Weyl transforms
- Modulation spaces and pseudodifferential operators
- Time-frequency analysis of localization operators.
- Continuity properties for modulation spaces, with applications to pseudo-differential calculus. I.
- Foundations of time-frequency analysis
- Boundedness of pseudodifferential operators with symbols in Wiener amalgam spaces on modulation spaces
- Bilinear localization operators on modulation spaces
- Continuity properties for modulation spaces, with applications to pseudo-differential calculus. II
- An algebra of pseudodifferential operators
- Wave packet analysis of Schrödinger equations in analytic function spaces
- Metaplectic representation on Wiener amalgam spaces and applications to the Schrödinger equation
- On the boundedness of pseudo-differential operators
- Schrödinger-type propagators, pseudodifferential operators and modulation spaces
- Gabor representations of evolution operators
- Generalized metaplectic operators and the Schrödinger equation with a potential in the Sjöstrand class
- Uniqueness in the Cauchy Problem for Partial Differential Equations
- Generalized Amalgams, With Applications to Fourier Transform
- Integral bounds for radar ambiguity functions and Wigner distributions
- Pseudodifferential Operators on Lp, Wiener Amalgam and Modulation Spaces"
- Weyl quantization of Lebesgue spaces
- Time-frequency localization operators: a geometric phase space approach
- The Lp-boundedness of pseudo-differential operators with non-regular symbols
- Sharp Integral Bounds for Wigner Distributions
- Time-frequency representations of Wigner type and pseudo-differential operators
- Propagation of the Gabor wave front set for Schrödinger equations with non-smooth potentials
- An algebra of pseudo‐differential operators
- Pseudodifferential operators on modulation spaces
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