Berlin, Heidelberg : , : Springer Berlin Heidelberg : , : Imprint : Springer, , 2008

3-540-68268-6

1 online resource (XXIV, 214 p. 11 illus.)

C.I.M.E. Foundation Subseries ; ; 1949

515.7242

Partial differential equations

Operator theory

Approximation theory

Fourier analysis

Numerical analysis

Quantum physics

Partial Differential Equations

Operator Theory

Approximations and Expansions

Fourier Analysis

Numerical Analysis

Quantum Physics

Inglese

Includes bibliographical references.

Includes bibliographical references and index.

Banach Gelfand Triples for Gabor Analysis -- Four Lectures in Semiclassical Analysis for Non Self-Adjoint Problems with Applications to Hydrodynamic Instability -- An Introduction to Numerical Methods of Pseudodifferential Operators -- Some Facts About the Wick Calculus -- Schatten Properties for Pseudo-Differential Operators on Modulation Spaces.

Pseudo-differential operators were initiated by Kohn, Nirenberg and Hörmander in the sixties of the last century. Beside applications in the

general theory of partial differential equations, they have their roots also in the study of quantization first envisaged by Hermann Weyl thirty years earlier. Thanks to the understanding of the connections of wavelets with other branches of mathematical analysis, quantum physics and engineering, such operators have been used under different names as mathematical models in signal analysis since the last decade of the last century. The volume investigates the mathematics of quantization and signals in the context of pseudo-differential operators, Weyl transforms, Daubechies operators, Wick quantization and time-frequency localization operators. Applications to quantization, signal analysis and the modern theory of PDE are highlighted.