In this paper, we study a gradient-type method and a semismooth Newton method for minimization problems in regularizing inverse problems with nonnegative and sparse solutions. We propose a special penalty functional forcing the minimizers of regularized minimization problems to be nonnegative and sparse, and then we apply the proposed algorithms in a practical the problem. The strong convergence of the gradient-type method and the local superlinear convergence of the semismooth Newton method are proven. Then, we use these algorithms for the phase retrieval problem and illustrate their efficiency in numerical examples, particularly in the practical problem of optical imaging through scattering media where all the noises from experiment are p...
Regularization is necessary for solving nonlinear ill-posed inverse problems arising in different fi...
Inverse problems and regularization theory is a central theme in contemporary signal processing, whe...
International audienceRegularization is necessary for solving nonlinear ill-posed inverse problems a...
In this paper, we study a gradient-type method and a semismooth Newton method for minimization probl...
Sparsity regularization method has been analyzed for linear and nonlinear inverse problems over the ...
This paper addresses image and signal processing problems where the result most consistent with prio...
In many inverse problems the operator to be inverted is not known precisely, but only a noisy versio...
International audienceThe phase retrieval process is a nonlinear ill-posed problem. The Fresnel diff...
This work addresses the issue of undersampled phase retrieval using the gradient framework and proxi...
Many branches of science and engineering are concerned with the problem of recording signals from ph...
International audienceSparse data models are powerful tools for solving ill-posed inverse problems. ...
An algorithmic framework, based on the difference of convex functions algorithm, is proposed for min...
This chapter is concerned with two important topics in the context of sparse recovery in inverse and...
We study the sparse phase retrieval problem, which aims to recover a sparse signal from a limited nu...
Thesis (Ph.D.)--University of Washington, 2021Optimization approaches to inverse problems and parame...
Regularization is necessary for solving nonlinear ill-posed inverse problems arising in different fi...
Inverse problems and regularization theory is a central theme in contemporary signal processing, whe...
International audienceRegularization is necessary for solving nonlinear ill-posed inverse problems a...
In this paper, we study a gradient-type method and a semismooth Newton method for minimization probl...
Sparsity regularization method has been analyzed for linear and nonlinear inverse problems over the ...
This paper addresses image and signal processing problems where the result most consistent with prio...
In many inverse problems the operator to be inverted is not known precisely, but only a noisy versio...
International audienceThe phase retrieval process is a nonlinear ill-posed problem. The Fresnel diff...
This work addresses the issue of undersampled phase retrieval using the gradient framework and proxi...
Many branches of science and engineering are concerned with the problem of recording signals from ph...
International audienceSparse data models are powerful tools for solving ill-posed inverse problems. ...
An algorithmic framework, based on the difference of convex functions algorithm, is proposed for min...
This chapter is concerned with two important topics in the context of sparse recovery in inverse and...
We study the sparse phase retrieval problem, which aims to recover a sparse signal from a limited nu...
Thesis (Ph.D.)--University of Washington, 2021Optimization approaches to inverse problems and parame...
Regularization is necessary for solving nonlinear ill-posed inverse problems arising in different fi...
Inverse problems and regularization theory is a central theme in contemporary signal processing, whe...
International audienceRegularization is necessary for solving nonlinear ill-posed inverse problems a...