On the tangential cone condition for electrical impedance tomography
From MaRDI portal
Publication:2153954
DOI10.1553/etna_vol57s17OpenAlexW3158619780MaRDI QIDQ2153954
Publication date: 13 July 2022
Published in: ETNA. Electronic Transactions on Numerical Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2105.02635
Ill-posedness and regularization problems in numerical linear algebra (65F22) Nonlinear ill-posed problems (47J06)
Related Items (2)
A numerical comparison of some heuristic stopping rules for nonlinear Landweber iteration ⋮ On a Dynamic Variant of the Iteratively Regularized Gauss–Newton Method with Sequential Data
Cites Work
- Unnamed Item
- Iterative regularization methods for nonlinear ill-posed problems
- A convergence analysis of the Landweber iteration for nonlinear ill-posed problems
- Convergence criteria of iterative methods based on Landweber iteration for solving nonlinear problems
- Uniqueness, stability and global convergence for a discrete inverse elliptic Robin transmission problem
- Convergence of the gradient method for ill-posed problems
- Lipschitz stability for the inverse conductivity problem
- Local analysis of inverse problems: Hölder stability and iterative reconstruction
- Exact Shape-Reconstruction by One-Step Linearization in Electrical Impedance Tomography
- Newton regularizations for impedance tomography: convergence by local injectivity
- Size estimation of inclusion
- The Inverse Conductivity Problem with One Measurement: Stability and Estimation of Size
- Numerical implementation of two noniterative methods for locating inclusions by impedance tomography
- Numerical method for finding the convex hull of an inclusion in conductivity from boundary measurements
- Electrical impedance tomography
- Monotonicity-Based Shape Reconstruction in Electrical Impedance Tomography
- Inverse problems for partial differential equations
This page was built for publication: On the tangential cone condition for electrical impedance tomography
