We propose several formulations for recovering discontinuous coefficients in elliptic problems by using total variation (TV) regularization. The motivation for using TV is its well-established ability to recover sharp discontinuities. We employ an augmented Lagrangian variational formulation for solving the output-least-squares inverse problem. In addition to the basic output-least-squares formulation, we introduce two new techniques for handling large observation errors. First, we use a filtering step to remove as much of the observation error as possible. Second, we introduce two extensions of the output-least-squares model; one model employs observations of the gradient of the state variable while the other uses the flux. Numerical exper...
AbstractWe illustrate with numerical experiments the behavior of certain algorithms based on exact r...
We present an analysis of the exact effects of Total Variation (TV) minimizing function regularizati...
Abstract. Elliptic partial differential equations (PDEs) with discontinuous diffusion coefficients o...
The solution of an elliptic boundary value problem is an infinitely differentiable function of the c...
An inverse problem is the process whereby data are used to identify unknown parameters in a system o...
The coefficient in a linear elliptic partial differential equation can be estimated from interior me...
Abstract. We consider numerical methods for solving problems involving total variation (TV) regulari...
International audienceWe introduce an algorithm to solve linear inverse problems regularized with th...
Abstract. Total variation (TV) regularization, originally introduced by Rudin, Osher and Fatemi in t...
The method of equation error can be posed and analyzed in an abstract setting that encompasses a var...
In this work, based on the collage theorem, we develop a new numerical approach to reconstruct the l...
Numerous mathematical models in applied mathematics can be expressed as a partial differential equat...
Abstract. Elliptic PDEs with discontinuous diffusion coefficients occur in application domains such ...
Sunnyson Y.F. Seid.Thesis (M.Phil.)--Chinese University of Hong Kong, 1997.Includes bibliographical ...
AbstractWe investigate the convergence rates for total variation regularization of the problem of id...
AbstractWe illustrate with numerical experiments the behavior of certain algorithms based on exact r...
We present an analysis of the exact effects of Total Variation (TV) minimizing function regularizati...
Abstract. Elliptic partial differential equations (PDEs) with discontinuous diffusion coefficients o...
The solution of an elliptic boundary value problem is an infinitely differentiable function of the c...
An inverse problem is the process whereby data are used to identify unknown parameters in a system o...
The coefficient in a linear elliptic partial differential equation can be estimated from interior me...
Abstract. We consider numerical methods for solving problems involving total variation (TV) regulari...
International audienceWe introduce an algorithm to solve linear inverse problems regularized with th...
Abstract. Total variation (TV) regularization, originally introduced by Rudin, Osher and Fatemi in t...
The method of equation error can be posed and analyzed in an abstract setting that encompasses a var...
In this work, based on the collage theorem, we develop a new numerical approach to reconstruct the l...
Numerous mathematical models in applied mathematics can be expressed as a partial differential equat...
Abstract. Elliptic PDEs with discontinuous diffusion coefficients occur in application domains such ...
Sunnyson Y.F. Seid.Thesis (M.Phil.)--Chinese University of Hong Kong, 1997.Includes bibliographical ...
AbstractWe investigate the convergence rates for total variation regularization of the problem of id...
AbstractWe illustrate with numerical experiments the behavior of certain algorithms based on exact r...
We present an analysis of the exact effects of Total Variation (TV) minimizing function regularizati...
Abstract. Elliptic partial differential equations (PDEs) with discontinuous diffusion coefficients o...