The Green’s function, defined as the response recorded at the acquisition sur-face for a source located in the interior of the subsurface, is a combination of the downgoing and upgoing wave fields needed to reconstruct an image of the discontinuities inside the earth. Two-sided Green’s function representations re-quire measurement on the full boundary enclosing the domain of interest and allow us to retrieve the Green’s function originating from any location inside the medium. Practical constraints usually prevent the placement of receivers at depth inside the earth; hence standard imaging techniques need to apply approx-imations to two-sided Green’s function representations to construct an image of the subsurface. Recently-developed one-si...
In 1968, Jon Claerbout showed that the reflection response of a 1D acoustic medium can be reconstruc...
summary Recently we introduced a new approach for retrieving the Green’s response to a virtual sourc...
Marchenko methods are based on integral representations which express Green’s functions for virtual ...
Green's theorem plays a fundamental role in a diverse range of wavefield imaging applications, such ...
The homogeneous Green’s function (i.e., the Green’s function and its time-reversed counterpart) play...
In wave theory, the homogeneous Green’s function consists of the impulse response to a point source,...
The cross-correlation of acoustic wave fields at two receivers yields the exact Green's function bet...
The homogeneous Green’s function is the Green’s function minus its timereversal. Many wavefield imag...
The homogeneous Green’s function is the difference between an impulse response and its time-reversal...
Recently a new theory has been developed to retrieve a wave-field generated by a source on the surfa...
The term seismic interferometry refers to the principle of generating new seismic responses by cross...
Recently a new theory has been developed to retrieve a wavefield generated by a source on the surfac...
In wave theory, a Green’s function is defined as the response of a medium to an impulsive point sour...
A general one-way representation of seismic data can be obtained by substituting a Green’s one-way w...
Classical acoustic wave-field representations consist of volume and boundary integrals, of which the...
In 1968, Jon Claerbout showed that the reflection response of a 1D acoustic medium can be reconstruc...
summary Recently we introduced a new approach for retrieving the Green’s response to a virtual sourc...
Marchenko methods are based on integral representations which express Green’s functions for virtual ...
Green's theorem plays a fundamental role in a diverse range of wavefield imaging applications, such ...
The homogeneous Green’s function (i.e., the Green’s function and its time-reversed counterpart) play...
In wave theory, the homogeneous Green’s function consists of the impulse response to a point source,...
The cross-correlation of acoustic wave fields at two receivers yields the exact Green's function bet...
The homogeneous Green’s function is the Green’s function minus its timereversal. Many wavefield imag...
The homogeneous Green’s function is the difference between an impulse response and its time-reversal...
Recently a new theory has been developed to retrieve a wave-field generated by a source on the surfa...
The term seismic interferometry refers to the principle of generating new seismic responses by cross...
Recently a new theory has been developed to retrieve a wavefield generated by a source on the surfac...
In wave theory, a Green’s function is defined as the response of a medium to an impulsive point sour...
A general one-way representation of seismic data can be obtained by substituting a Green’s one-way w...
Classical acoustic wave-field representations consist of volume and boundary integrals, of which the...
In 1968, Jon Claerbout showed that the reflection response of a 1D acoustic medium can be reconstruc...
summary Recently we introduced a new approach for retrieving the Green’s response to a virtual sourc...
Marchenko methods are based on integral representations which express Green’s functions for virtual ...