We review Fourier methods used in the disciplines of electromagnetism and signal processing, with a view to reconciling differences in approach. In particular, Fourier methods well known in signal processing are applied to three-dimensional wave propagation problems. The Fourier transform of the Green function, when written explicitly in terms of a real-valued spatial frequency, consists of homogeneous and inhomogeneous components. Both parts are necessary to result in a pure out-going wave that satisfies causality. The homogeneous component consists only of propagating waves, but the inhomogeneous component contains both evanescent and propagating terms. Thus, we make a distinction between inhomogeneous waves and evanescent waves. The evan...
Unlike the traditional way to evaluate potential flows by integrating a singularity distribution on ...
The importance of expanding Green's functions, particularly free-space Green's functions in terms of...
A simple relation between the fractional Fourier transform (FRACFT) and the Green's function for the...
A procedure is given to perform the inverse Fourier transformation relating a spatial Green's functi...
This paper provides a new analytical method to obtain Green's functions of linear dispersive partial...
The term seismic interferometry refers to the principle of generating new seismic responses by cross...
We have developed explicit expressions and the corresponding computer code for all homogeneous space...
International audiencePlane-wave expansions (PWEs) based on Fourier transform and their physical int...
Green's theorem plays a fundamental role in a diverse range of wavefield imaging applications, such ...
In wave theory, the homogeneous Green’s function consists of the impulse response to a point source,...
A method for an approximate computation of the electric and magnetic Green's functions for the time-...
A method for an approximate computation of the electric and magnetic Green's functions for the time-...
This book is an introduction to Fourier Transformation with a focus on signal analysis, based on the...
A study of the quantitative solutional approaches to boundary-value problems associated with terrest...
Wave propagation is considered in multidimensional reciprocal space. For the first Rayleigh-Sommerfe...
Unlike the traditional way to evaluate potential flows by integrating a singularity distribution on ...
The importance of expanding Green's functions, particularly free-space Green's functions in terms of...
A simple relation between the fractional Fourier transform (FRACFT) and the Green's function for the...
A procedure is given to perform the inverse Fourier transformation relating a spatial Green's functi...
This paper provides a new analytical method to obtain Green's functions of linear dispersive partial...
The term seismic interferometry refers to the principle of generating new seismic responses by cross...
We have developed explicit expressions and the corresponding computer code for all homogeneous space...
International audiencePlane-wave expansions (PWEs) based on Fourier transform and their physical int...
Green's theorem plays a fundamental role in a diverse range of wavefield imaging applications, such ...
In wave theory, the homogeneous Green’s function consists of the impulse response to a point source,...
A method for an approximate computation of the electric and magnetic Green's functions for the time-...
A method for an approximate computation of the electric and magnetic Green's functions for the time-...
This book is an introduction to Fourier Transformation with a focus on signal analysis, based on the...
A study of the quantitative solutional approaches to boundary-value problems associated with terrest...
Wave propagation is considered in multidimensional reciprocal space. For the first Rayleigh-Sommerfe...
Unlike the traditional way to evaluate potential flows by integrating a singularity distribution on ...
The importance of expanding Green's functions, particularly free-space Green's functions in terms of...
A simple relation between the fractional Fourier transform (FRACFT) and the Green's function for the...