Add to ORKGElectrical Impedance Imaging would suffer a serious obstruction if for two different conductivities the potential and current measured at the boundary were the same. The Calder\'on's problem is to decide whether the conductivity is indeed uniquely determined by the data at the boundary. In $\mathbb{R}^d$, for $d=5,6$, we show that uniqueness holds when the conductivity is in $W^{1+\frac{d-5}{2p}+,p}(\Omega)$, for $d\le p<\infty$. This improves on recent results of Haberman, and of Ham, Kwon and Lee. The main novelty of the proof is an extension of Tao's bilinear Theorem
summary:We investigate the problem with perturbed periodic boundary values \[ \left\rbrace \begin{ar...
AbstractThe goal of this paper is to study the existence and uniqueness of positive solutions for th...
The purpose of this paper is to study boundary value problems for elliptic pseudo-differential opera...
We prove uniqueness for the Calderón problem with Lipschitz conductivities in higher dimensions. Com...
In this paper, following Nachman's idea [14] and Haberman and Tataru's idea [9], we reconstruct $C^1...
International audienceAn electrical potential U on bordered surface X (in Euclidien three-dimensiona...
AbstractIn these notes we prove log-type stability for the Calderón problem with conductivities in C...
AbstractWe consider a family of singular transmission problems depending on some small positive para...
AbstractIn this paper we analyze the boundary behavior of the unique solution to the singular Dirich...
We consider a non local boundary value problem for elliptic operator on a two dimensional domain wit...
Imposing either Dirichlet or Neumann boundary conditions on the boundary of a smooth bounded domain ...
AbstractA uniqueness theorem is proven for the problem of the recovery of a complex valued compactly...
AbstractIt is proved that, in two dimensions, the Calderón inverse conductivity problem in Lipschitz...
The goal of this paper is to study a class of nonlinear functional elliptic equations using very sim...
Travail publiable, 14 pagesExposé dans les journées internationales de maths Algero-française a Cons...
summary:We investigate the problem with perturbed periodic boundary values \[ \left\rbrace \begin{ar...
AbstractThe goal of this paper is to study the existence and uniqueness of positive solutions for th...
The purpose of this paper is to study boundary value problems for elliptic pseudo-differential opera...
We prove uniqueness for the Calderón problem with Lipschitz conductivities in higher dimensions. Com...
In this paper, following Nachman's idea [14] and Haberman and Tataru's idea [9], we reconstruct $C^1...
International audienceAn electrical potential U on bordered surface X (in Euclidien three-dimensiona...
AbstractIn these notes we prove log-type stability for the Calderón problem with conductivities in C...
AbstractWe consider a family of singular transmission problems depending on some small positive para...
AbstractIn this paper we analyze the boundary behavior of the unique solution to the singular Dirich...
We consider a non local boundary value problem for elliptic operator on a two dimensional domain wit...
Imposing either Dirichlet or Neumann boundary conditions on the boundary of a smooth bounded domain ...
AbstractA uniqueness theorem is proven for the problem of the recovery of a complex valued compactly...
AbstractIt is proved that, in two dimensions, the Calderón inverse conductivity problem in Lipschitz...
The goal of this paper is to study a class of nonlinear functional elliptic equations using very sim...
Travail publiable, 14 pagesExposé dans les journées internationales de maths Algero-française a Cons...
summary:We investigate the problem with perturbed periodic boundary values \[ \left\rbrace \begin{ar...
AbstractThe goal of this paper is to study the existence and uniqueness of positive solutions for th...
The purpose of this paper is to study boundary value problems for elliptic pseudo-differential opera...