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Quasi-solution in inverse coefficient problems
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S. Kabanikhin
Veröffentlicht/Copyright:
21. November 2008
Abstract
In this paper we apply the notion of quasi-solution to nonlinear inverse coefficient problems. Instead of a compact set M we use the ball B(0, r) in which the radius r occurred to be sometimes a regularization parameter. Moreover this constant allows one to estimate the convergence rate for many well-known algorithms for solving inverse coefficient problems and to decrease crucially the number of iterations.
Received: 2008-10-05
Published Online: 2008-11-21
Published in Print: 2008-November
© de Gruyter 2008
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Artikel in diesem Heft
- Localization algorithms for singularities of solutions to convolution equations of the first kind
- Unimprovable estimates of solutions for some classes of integral inequalities
- Relative computational efficiency of iteratively regularized methods
- Uniqueness of solution to an inverse problem for a semilinear system of partial differential equations
- Quasi-solution in inverse coefficient problems
- Inverse nodal problems for Sturm–Liouville operators on star-type graphs
- Fifth International Conference. Algorithmic Analysis of Unstable Problems (AAUP-2008)
Artikel in diesem Heft
- Localization algorithms for singularities of solutions to convolution equations of the first kind
- Unimprovable estimates of solutions for some classes of integral inequalities
- Relative computational efficiency of iteratively regularized methods
- Uniqueness of solution to an inverse problem for a semilinear system of partial differential equations
- Quasi-solution in inverse coefficient problems
- Inverse nodal problems for Sturm–Liouville operators on star-type graphs
- Fifth International Conference. Algorithmic Analysis of Unstable Problems (AAUP-2008)
