Locally extra-optimal regularizing algorithms and a posteriori estimates of the accuracy for ill-posed problems with discontinuous solutions
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Publication:2629968
DOI10.1134/S0965542516010127zbMath1344.49051MaRDI QIDQ2629968
Publication date: 8 July 2016
Published in: Computational Mathematics and Mathematical Physics (Search for Journal in Brave)
convex optimizationdiscontinuous solutionslocally extra-optimal regularizing algorithmill-posed inverse problemslocal a-posteriori estimate
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Solution of the inverse elastography problem for parametric classes of inclusions with a posteriori error estimate ⋮ Effective algorithms for computing global and local posterior error estimates of solutions to linear ill-posed problems ⋮ Extra-optimal methods for solving ill-posed problems: survey of theory and examples
Cites Work
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- Locally extra-optimal regularizing algorithms
- A posteriori error estimates for approximate solutions of irregular operator equations
- Functions of several variables with bounded variation in ill-posed problems
- Methods for solving operator equations
- Theory of linear ill-posed problems and its applications. Transl., updated and revised from the Russian edition 1978
- Analysis of bounded variation penalty methods for ill-posed problems
- Numerical piecewise-uniform regularization for two-dimensional ill-posed problems
- On Definitions of Bounded Variation for Functions of Two Variables
- A posteriori accuracy estimations of solutions to ill-posed inverse problems and extra-optimal regularizing algorithms for their solution
- A posteriori error analysis for unstable models
- On inverse problems in partially ordered spaces with a priori information
- Extra-optimal methods for solving ill-posed problems
- Piecewise uniform regularization of two-dimensional ill-posed problems with discontinuous solutions
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