Global Lipschitz stability estimates for polygonal conductivity inclusions from boundary measurements
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Publication:5090264
DOI10.1080/00036811.2020.1775819zbMath1494.35180arXiv1901.01152OpenAlexW3032997056MaRDI QIDQ5090264
Publication date: 18 July 2022
Published in: Applicable Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1901.01152
Boundary value problems for second-order elliptic equations (35J25) Inverse problems for PDEs (35R30) A priori estimates in context of PDEs (35B45)
Related Items (6)
Lipschitz Stable Determination of Polyhedral Conductivity Inclusions from Local Boundary Measurements ⋮ Inverse problems on low-dimensional manifolds ⋮ A combination of Kohn-Vogelius and DDM methods for a geometrical inverse problem ⋮ Stable determination of an anisotropic inclusion in the Schrödinger equation from local Cauchy data ⋮ Infinite-dimensional inverse problems with finite measurements ⋮ On Calderón’s inverse inclusion problem with smooth shapes by a single partial boundary measurement
Cites Work
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- Stable determination of an inclusion in an inhomogeneous elastic body by boundary measurements
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- Lipschitz stability for a stationary 2D inverse problem with unknown polygonal boundary
- Stable Determination of Polyhedral Interfaces from Boundary Data for the Helmholtz Equation
- Stability for an Inverse Problem in Potential Theory
- The Inverse Conductivity Problem with One Measurement: Uniqueness for Convex Polyhedra
- Examples of exponential instability for inverse inclusion and scattering problems
- Uniqueness and Lipschitz stability in electrical impedance tomography with finitely many electrodes
- Uniqueness in the two-dimensional inverse conductivity problems of determining convex polygonal supports: case of variable conductivity
- CALDERÓN’S INVERSE PROBLEM WITH A FINITE NUMBER OF MEASUREMENTS
- An inverse problem for the Helmholtz equation
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