In this work, based on the collage theorem, we develop a new numerical approach to reconstruct the locations of discontinuity of the conduction coefficient in elliptic partial differential equations (PDEs) with inaccurate measurement data and coefficient value. For a given conductivity coefficient, one can construct a contraction mapping such that its fixed point is just the gradient of a solution to the elliptic system. Therefore, the problem of reconstructing a conductivity coefficient in PDEs can be considered as an approximation of the observation data by the fixed point of a contraction mapping. By collage theorem, we translate it to seek a contraction mapping that keeps the observation data as close as possible to itself, which avoids...
In this paper, we present several methods based on the collage theorem and its extensions for solvin...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
In this work, based on the collage theorem, we develop a new numerical approach to reconstruct the l...
The essence of collage-based methods for solving inverse problems is to bound the approximation erro...
We propose several formulations for recovering discontinuous coefficients in elliptic problems by us...
International audienceThis paper concerns the reconstruction of a scalar coefficient of a second-ord...
Abstract. Elliptic PDEs with discontinuous diffusion coefficients occur in application domains such ...
Abstract. Elliptic partial differential equations (PDEs) with discontinuous diffusion coefficients o...
The coefficient in a linear elliptic partial differential equation can be estimated from interior me...
Some inverse problems can be cast as approximating a given target function (perhaps the interpolatio...
"We review the variational approach to the inverse conductivity problem, in the case of discontinuou...
The treatment of an inverse problem on a perforated domain is complicated heavily by the presence of...
Thesis (Ph.D.)--University of Washington, 2018An inverse problem is a mathematical framework that is...
Numerous mathematical models in applied mathematics can be expressed as a partial differential equat...
In this paper, we present several methods based on the collage theorem and its extensions for solvin...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
In this work, based on the collage theorem, we develop a new numerical approach to reconstruct the l...
The essence of collage-based methods for solving inverse problems is to bound the approximation erro...
We propose several formulations for recovering discontinuous coefficients in elliptic problems by us...
International audienceThis paper concerns the reconstruction of a scalar coefficient of a second-ord...
Abstract. Elliptic PDEs with discontinuous diffusion coefficients occur in application domains such ...
Abstract. Elliptic partial differential equations (PDEs) with discontinuous diffusion coefficients o...
The coefficient in a linear elliptic partial differential equation can be estimated from interior me...
Some inverse problems can be cast as approximating a given target function (perhaps the interpolatio...
"We review the variational approach to the inverse conductivity problem, in the case of discontinuou...
The treatment of an inverse problem on a perforated domain is complicated heavily by the presence of...
Thesis (Ph.D.)--University of Washington, 2018An inverse problem is a mathematical framework that is...
Numerous mathematical models in applied mathematics can be expressed as a partial differential equat...
In this paper, we present several methods based on the collage theorem and its extensions for solvin...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...