Uniqueness in Calderón's problem with Lipschitz conductivities

On some partial data Calderón type problems with mixed boundary conditions ⋮ Calderón problem for the $p$-Laplacian: First order derivative of conductivity on the boundary ⋮ A partially reflecting random walk on spheres algorithm for electrical impedance tomography ⋮ Propagation and recovery of singularities in the inverse conductivity problem ⋮ Local uniqueness for an inverse boundary value problem with partial data ⋮ The Calderón problem with partial data for conductivities with 3/2 derivatives ⋮ GLOBAL UNIQUENESS FOR THE CALDERÓN PROBLEM WITH LIPSCHITZ CONDUCTIVITIES ⋮ Inverse boundary value problems for polyharmonic operators with non-smooth coefficients ⋮ Global Identifiability of Low Regularity Fluid Parameters in Acoustic Tomography of Moving Fluid ⋮ Nonlinear Fourier analysis for discontinuous conductivities: computational results ⋮ Comparison of linear and non-linear monotonicity-based shape reconstruction using exact matrix characterizations ⋮ Uniqueness in inverse acoustic scattering with unbounded gradient across Lipschitz surfaces ⋮ Cloaking for a quasi-linear elliptic partial differential equation ⋮ Determination of singular time-dependent coefficients for wave equations from full and partial data ⋮ Uniqueness for inverse boundary value problems by Dirichlet-to-Neumann map on subboundaries ⋮ Construction of Indistinguishable Conductivity Perturbations for the Point Electrode Model in Electrical Impedance Tomography ⋮ Distinguishability Revisited: Depth Dependent Bounds on Reconstruction Quality in Electrical Impedance Tomography ⋮ Detecting anisotropic inclusions through EIT ⋮ Determining Lamé coefficients by the elastic Dirichlet-to-Neumann map on a Riemannian manifold ⋮ \(G\)-convergence, Dirichlet to Neumann maps and invisibility ⋮ The anisotropic Calderón problem for singular metrics of warped product type: the borderline between uniqueness and invisibility ⋮ Simultaneous recovery of piecewise analytic coefficients in a semilinear elliptic equation ⋮ The Calderón problem with corrupted data ⋮ Singular integrals and Feller semigroups with jump phenomena ⋮ Low regularity theory for the inverse fractional conductivity problem ⋮ Identifiability of electrical and heat transfer parameters using coupled boundary measurements ⋮ Characterization for stability in planar conductivities ⋮ An inverse problem for Maxwell’s equations with Lipschitz parameters ⋮ SUFFICIENT CONDITIONS FOR THE EXISTENCE OF LIMITING CARLEMAN WEIGHTS ⋮ Calderón's problem for some classes of conductivities in circularly symmetric domains ⋮ The Observational Limit of Wave Packets with Noisy Measurements ⋮ Uniqueness and Lipschitz stability in electrical impedance tomography with finitely many electrodes ⋮ Uniqueness in an inverse boundary problem for a magnetic Schrödinger operator with a bounded magnetic potential ⋮ A multiscale theory for image registration and nonlinear inverse problems ⋮ The Calderón inverse problem for isotropic quasilinear conductivities ⋮ Partial data for the Neumann-to-Dirichlet map ⋮ A bilinear strategy for Calderón's problem ⋮ Uniqueness in Calderón's problem for conductivities with unbounded gradient ⋮ Boundary determination of electromagnetic and Lamé parameters with corrupted data ⋮ A nonlinear Plancherel theorem with applications to global well-posedness for the defocusing Davey-Stewartson equation and to the inverse boundary value problem of Calderón ⋮ Applications of CGO solutions to coupled-physics inverse problems ⋮ Lipschitz stability for the electrostatic inverse boundary value problem with piecewise linear conductivities ⋮ Uniqueness, stability and global convergence for a discrete inverse elliptic Robin transmission problem ⋮ Probabilistic interpretation of the Calderón problem ⋮ Inverse problems: seeing the unseen ⋮ Scattering with critically-singular and \(\delta \)-shell potentials ⋮ Inverse problems and invisibility cloaking for FEM models and resistor networks ⋮ Electrical Impedance Tomography ⋮ Uniqueness for an inverse problem in electromagnetism with partial data ⋮ Recovery of Nonsmooth Coefficients Appearing in Anisotropic Wave Equations ⋮ Uniqueness in the Calderón problem and bilinear restriction estimates ⋮ Stability estimates for the inverse boundary value problem by partial Cauchy data ⋮ ON NONUNIQUENESS FOR THE ANISOTROPIC CALDERÓN PROBLEM WITH PARTIAL DATA ⋮ CGO-Faddeev approach for complex conductivities with regular jumps in two dimensions ⋮ Partial data inverse problem with 𝐿^{𝑛/2} potentials ⋮ Comments on the determination of the conductivity by boundary measurements ⋮ Reconstruction and stability for piecewise smooth potentials in the plane ⋮ On the uniqueness of inverse problems for the reduced wave equation with unknown embedded obstacles ⋮ RECONSTRUCTION ALGORITHMS OF AN INVERSE COEFFICIENT IDENTIFICATION PROBLEM FOR THE SCHRODINGER EQUATION ⋮ Stability of the Calderón problem in admissible geometries ⋮ A partial data result for less regular conductivities in admissible geometries ⋮ 30 years of Calderón's problem ⋮ The Neumann-to-Dirichlet map in two dimensions

• A global uniqueness theorem for an inverse boundary value problem
• Fourier transform restriction phenomena for certain lattice subsets and applications to nonlinear evolution equations. I: Schrödinger equations
• Complex geometrical optics solutions for Lipschitz conductivities.
• Singular solutions of elliptic equations and the determination of conductivity by boundary measurements
• Local uniqueness for the Dirichlet-to-Neumann map via the two-plane transform
• Uniqueness in the inverse conductivity problem for conductivities with \(3/2\) derivatives in \(L^p\), \(p>2n\)
• On an inverse boundary value problem
• Calderón's problem for Lipschitz piecewise smooth conductivities
• Determining conductivity by boundary measurements
• A uniqueness theorem for an inverse boundary value problem in electrical prospection
• The Calderón problem for conormal potentials I: Global uniqueness and reconstruction
• Global Uniqueness in the Impedance-Imaging Problem for Less Regular Conductivities