Add to ORKGIn this paper, following Nachman's idea [14] and Haberman and Tataru's idea [9], we reconstruct $C^1$ conductivity $\gamma$ or Lipchitz conductivity $\gamma$ with small enough value of $|\nabla log\gamma|$ in a Lipschitz domain $\Omega$ from the Dirichlet-to-Neumann map $\Lambda_{\gamma}$. In the appendix the authors and R. M. Brown recover the gradient of a $C^1$-conductivity at the boundary of a Lipschitz domain from the Dirichlet-to-Neumann map $\Lambda_{\gamma}$
An electrical potential U on a bordered Riemann surface X with conductivity function sigma>0 satisfi...
We prove that an L∞ potential in the Schrödinger equation in three and higher dimensions can be uniq...
We consider a boundary value problem for the Schr¨odinger operator−Δ+q(x) in a ball Ω : (x1 +R)2 +x2...
We describe a method to reconstruct the conductivity and its normal derivative at the boundary from ...
International audienceAn electrical potential U on bordered surface X (in Euclidien three-dimensiona...
We prove uniqueness for the Calderón problem with Lipschitz conductivities in higher dimensions. Com...
AbstractThe Dirichlet to Neumann map Λγ, or voltage to current map, takes Dirichlet data u=f∈∂Ω to t...
Electrical Impedance Imaging would suffer a serious obstruction if for two different conductivities ...
Imposing either Dirichlet or Neumann boundary conditions on the boundary of a smooth bounded domain ...
In this paper we consider the inverse conductivity problem with partial data. We prove that in dimen...
AbstractIt is proved that, in two dimensions, the Calderón inverse conductivity problem in Lipschitz...
We consider an inverse problem regarding the detection of small conductivity inhomogeneities in a bo...
AbstractIn these notes we prove log-type stability for the Calderón problem with conductivities in C...
peer-reviewedWe address the stability issue in Calderon’s problem for a special class of anisotropi...
In this paper, we shall estimate the growth order of the n-th derivative Cauchy integrals at a point...
An electrical potential U on a bordered Riemann surface X with conductivity function sigma>0 satisfi...
We prove that an L∞ potential in the Schrödinger equation in three and higher dimensions can be uniq...
We consider a boundary value problem for the Schr¨odinger operator−Δ+q(x) in a ball Ω : (x1 +R)2 +x2...
We describe a method to reconstruct the conductivity and its normal derivative at the boundary from ...
International audienceAn electrical potential U on bordered surface X (in Euclidien three-dimensiona...
We prove uniqueness for the Calderón problem with Lipschitz conductivities in higher dimensions. Com...
AbstractThe Dirichlet to Neumann map Λγ, or voltage to current map, takes Dirichlet data u=f∈∂Ω to t...
Electrical Impedance Imaging would suffer a serious obstruction if for two different conductivities ...
Imposing either Dirichlet or Neumann boundary conditions on the boundary of a smooth bounded domain ...
In this paper we consider the inverse conductivity problem with partial data. We prove that in dimen...
AbstractIt is proved that, in two dimensions, the Calderón inverse conductivity problem in Lipschitz...
We consider an inverse problem regarding the detection of small conductivity inhomogeneities in a bo...
AbstractIn these notes we prove log-type stability for the Calderón problem with conductivities in C...
peer-reviewedWe address the stability issue in Calderon’s problem for a special class of anisotropi...
In this paper, we shall estimate the growth order of the n-th derivative Cauchy integrals at a point...
An electrical potential U on a bordered Riemann surface X with conductivity function sigma>0 satisfi...
We prove that an L∞ potential in the Schrödinger equation in three and higher dimensions can be uniq...
We consider a boundary value problem for the Schr¨odinger operator−Δ+q(x) in a ball Ω : (x1 +R)2 +x2...