In the present work we treat the inverse problem of identifying the matrix-valued diffusion coefficient of an elliptic PDE from multiple interior measurements with the help of techniques from PDE constrained optimization. We prove existence of solutions using the concept of H-convergence and employ variational discretization for the discrete approximation of solutions. Using a discrete version of H-convergence we are able to establish the strong convergence of the discrete solutions. Finally we present some numerical results
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We study semi-linear elliptic PDEs with polynomial non-linearity in bounded domains and provide a pr...
Numerous mathematical models in applied mathematics can be expressed as a partial differential equat...
This paper addresses the estimation of uncertain distributed diffusion coefficients in elliptic syst...
In this work, we present a novel error analysis for recovering a spatially dependent diffusion coeff...
AbstractInverse, or identification, problems are currently receiving a great deal of attention in vi...
The identification problem of functional coefficients in an elliptic equation is considered. For thi...
The coefficient in a linear elliptic partial differential equation can be estimated from interior me...
AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·...
We investigate the continuity of boundary operators, such as the Neumann-to-Dirichlet map, with resp...
AbstractThe problem of identification of the diffusion coefficient in the partial differential equat...
We consider a parametric elliptic PDE with a scalar piecewise constant diffusion coefficient taking ...
This paper considers the Dirichlet problem −div(a∇u a) = f on D, u a = 0 on ∂D, for a Lipschitz doma...
We consider the nonlinear inverse problem of identifying a parameter from know-ledge of the physical...
AbstractWe investigate the convergence rates for total variation regularization of the problem of id...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We study semi-linear elliptic PDEs with polynomial non-linearity in bounded domains and provide a pr...
Numerous mathematical models in applied mathematics can be expressed as a partial differential equat...
This paper addresses the estimation of uncertain distributed diffusion coefficients in elliptic syst...
In this work, we present a novel error analysis for recovering a spatially dependent diffusion coeff...
AbstractInverse, or identification, problems are currently receiving a great deal of attention in vi...
The identification problem of functional coefficients in an elliptic equation is considered. For thi...
The coefficient in a linear elliptic partial differential equation can be estimated from interior me...
AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·...
We investigate the continuity of boundary operators, such as the Neumann-to-Dirichlet map, with resp...
AbstractThe problem of identification of the diffusion coefficient in the partial differential equat...
We consider a parametric elliptic PDE with a scalar piecewise constant diffusion coefficient taking ...
This paper considers the Dirichlet problem −div(a∇u a) = f on D, u a = 0 on ∂D, for a Lipschitz doma...
We consider the nonlinear inverse problem of identifying a parameter from know-ledge of the physical...
AbstractWe investigate the convergence rates for total variation regularization of the problem of id...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We study semi-linear elliptic PDEs with polynomial non-linearity in bounded domains and provide a pr...
Numerous mathematical models in applied mathematics can be expressed as a partial differential equat...