Sparse spikes deconvolution is one of the oldest inverse problems, which is a stylized version of recovery in seismic imaging. The goal of sparse spike deconvolution is to recover an approximation of a given noisy measurement T = W ∗ r + W 0 . Since the convolution destroys many low and high frequencies, this requires some prior information to regularize the inverse problem. In this paper, the authors continue to study the problem of searching for positions and amplitudes of the reflection coefficients of the medium (SP&ARCM). In previous research, the authors proposed a practical algorithm for solving the inverse problem of obtaining geological information from the seismic trace, which was named A 0 . In the curr...
Many seismic data processing and imaging processes require densely and regularly sampled data, where...
This article analyzes the recovery performance of two popular finit e dimensional approximations o...
Continuity along reflectors in seismic images is used via Curvelet representation to stabilize the c...
Sparse-spike deconvolution can be viewed as an inverse problem where the locations and amplitudes of...
In this paper we propose a stable high-resolution deconvolution algorithm that combines a priori inf...
Seismic surveys have become the primary measurement tool of exploration geophysics, both onshore and...
We consider an important class of signal processing problems where the signal of interest is known t...
In this work, the inverse problem of exploration geophysics is solved through two techniques based o...
The effects of several nonlinear regularization techniques are discussed in the framework of 3D seis...
We propose a sparse regularization model for inversion of incomplete Fourier transforms and apply it...
With the purpose of characterizing the Earth subsurface, one of the objectives of the inversion of p...
The development of new tools for high-resolution seismic imaging has been for many years one of the ...
Blind deconvolution aims at recovering both the source wavelet and the Green’s function (e.g. reflec...
International audienceWe present a realistic application of an inversion scheme for global seismic t...
The Radon transform (RT) has many desirable properties which make it particularly useful for multip...
Many seismic data processing and imaging processes require densely and regularly sampled data, where...
This article analyzes the recovery performance of two popular finit e dimensional approximations o...
Continuity along reflectors in seismic images is used via Curvelet representation to stabilize the c...
Sparse-spike deconvolution can be viewed as an inverse problem where the locations and amplitudes of...
In this paper we propose a stable high-resolution deconvolution algorithm that combines a priori inf...
Seismic surveys have become the primary measurement tool of exploration geophysics, both onshore and...
We consider an important class of signal processing problems where the signal of interest is known t...
In this work, the inverse problem of exploration geophysics is solved through two techniques based o...
The effects of several nonlinear regularization techniques are discussed in the framework of 3D seis...
We propose a sparse regularization model for inversion of incomplete Fourier transforms and apply it...
With the purpose of characterizing the Earth subsurface, one of the objectives of the inversion of p...
The development of new tools for high-resolution seismic imaging has been for many years one of the ...
Blind deconvolution aims at recovering both the source wavelet and the Green’s function (e.g. reflec...
International audienceWe present a realistic application of an inversion scheme for global seismic t...
The Radon transform (RT) has many desirable properties which make it particularly useful for multip...
Many seismic data processing and imaging processes require densely and regularly sampled data, where...
This article analyzes the recovery performance of two popular finit e dimensional approximations o...
Continuity along reflectors in seismic images is used via Curvelet representation to stabilize the c...