Add to ORKGWe investigate the problem of recovering a potential q(x) in the equation -∆u + q(x)u = 0 from overspecified boundary data on the unit square in R2. The potential is characterized as a fixed point of a nonlinear operator, which is shown to be a contraction on a ball in C∝. Uniqueness of q(x) follows, as does convergence of the resulting recovery scheme. Numerical examples, demonstrating the performance of the algorithm, are presented
AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·...
AbstractWe reconstruct a two-dimensional obstacleDfrom knowledge of its Dirichlet-to-Neumann map on ...
In this paper we consider the inverse boundary value problem for the Schrodinger equation with poten...
AbstractWe investigate the problem of recovering a potential q(x) in the equation −Δu + q(x)u = 0 fr...
We investigate the problem of recovering a potential q(y)in the differential equation: -∆u+q(y)u = 0...
We consider the inverse boundary value problem concerning the determination and reconstruction of an...
In this article we focus on inverse problems for a semilinear elliptic equation. We show that a pote...
International audienceThis article develops the numerical and theoretical study of the reconstructio...
Abstract. In this paper we study the question of uniqueness of an inverse problem, arising in the (t...
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We propose a globally convergent numerical method to compute solutions to a general class of quasi-l...
We consider the recovery of a potential associated with a semi-linear wave equation on Rn+1, n≥1. We...
The problem of recovering a potential q(y) in the differential equation: −∆u + q(y)u = 0 (x,y) &∈ (...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
International audienceWe consider the unique recovery of a non compactly supported and non periodic ...
AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·...
AbstractWe reconstruct a two-dimensional obstacleDfrom knowledge of its Dirichlet-to-Neumann map on ...
In this paper we consider the inverse boundary value problem for the Schrodinger equation with poten...
AbstractWe investigate the problem of recovering a potential q(x) in the equation −Δu + q(x)u = 0 fr...
We investigate the problem of recovering a potential q(y)in the differential equation: -∆u+q(y)u = 0...
We consider the inverse boundary value problem concerning the determination and reconstruction of an...
In this article we focus on inverse problems for a semilinear elliptic equation. We show that a pote...
International audienceThis article develops the numerical and theoretical study of the reconstructio...
Abstract. In this paper we study the question of uniqueness of an inverse problem, arising in the (t...
AbstractWe consider the question of recovering the coefficient q from the equation −Δuj+q(x)uj=ƒj(x)...
We propose a globally convergent numerical method to compute solutions to a general class of quasi-l...
We consider the recovery of a potential associated with a semi-linear wave equation on Rn+1, n≥1. We...
The problem of recovering a potential q(y) in the differential equation: −∆u + q(y)u = 0 (x,y) &∈ (...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
International audienceWe consider the unique recovery of a non compactly supported and non periodic ...
AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·...
AbstractWe reconstruct a two-dimensional obstacleDfrom knowledge of its Dirichlet-to-Neumann map on ...
In this paper we consider the inverse boundary value problem for the Schrodinger equation with poten...