COMPLEXITY ESTIMATES FOR SEVERELY ILL-POSED PROBLEMS UNDER A POSTERIORI SELECTION OF REGULARIZATION PARAMETER
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Publication:5015454
DOI10.3846/13926292.2017.1307284zbMath1488.65769OpenAlexW2615123869MaRDI QIDQ5015454
Ganna L. Myleiko, Sergii G. Solodky, Evgeniya V. Semenova
Publication date: 8 December 2021
Published in: Mathematical Modelling and Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3846/13926292.2017.1307284
Numerical methods for ill-posed problems for integral equations (65R30) Fredholm integral equations (45B05) Linear operators and ill-posed problems, regularization (47A52)
Cites Work
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- Complexity of linear ill-posed problems in Hilbert space
- Regularization theory for ill-posed problems. Selected topics
- The minimal radius of Galerkin information for severely ill-posed problems
- Hyperbolic cross and the complexity of the approximate solution of Fredholm integral equations of the second kind with differentiable kernels
- On the regularization of projection methods for solving ill-posed problems
- Information complexity of equations of the second kind with compact operators in Hilbert space
- Complexity of the problem of finding the solutions of Fredholm equations of the second kind with smooth kernels. II
- Optimization of projection methods for solving ill-posed problems
- The minimal radius of Galerkin information for the Fredholm problem of the first kind
- On optimization of projection methods for solving some classes of severely ill-posed problems
- A Lepskij-type stopping rule for regularized Newton methods
- About the Balancing Principle for Choice of the Regularization Parameter
- Complexity of the problem of finding the solutions of fredholm equations of the second kind with smooth kernels. I
- Tikhonov Regularization for Finitely and Infinitely Smoothing Operators
- Optimality for ill-posed problems under general source conditions
- Discretization strategy for linear ill-posed problems in variable Hilbert scales
- Regularization of exponentially ill-posed problems
- Morozov's discrepancy principle for tikhonov
- On a Problem of Adaptive Estimation in Gaussian White Noise
- ABOUT REGULARIZATION OF SEVERELY ILL-POSED PROBLEMS BY STANDARD TIKHONOV'S METHOD WITH THE BALANCING PRINCIPLE
- On the Adaptive Selection of the Parameter in Regularization of Ill-Posed Problems
- The approximate solution of operator equations of the first kind
- Optimization of projection methods for linear ill-posed problems
