A. Leitao
Published 2020-11-30Version 1
We investigate the iterative methods proposed by Maz'ya and Kozlov (see [3], [4]) for solving ill-posed reconstruction problems modeled by PDE's. We consider linear time dependent problems of elliptic, hyperbolic and parabolic types. Each iteration of the analyzed methods consists on the solution of a well posed boundary (or initial) value problem. The iterations are described as powers of affine operators, as in [4]. We give alternative convergence proofs for the algorithms, using spectral theory and some functional analytical results (see [5], [6]).
Comments: 13 pages 5 figures. arXiv admin note: substantial text overlap with arXiv:2011.14441
Journal: Matem\'atica Contempor\^anea 18 (2000), 195-207
Regularization of Inverse Problems by Filtered Diagonal Frame Decomposition
Interpolation and inverse problems in spectral Barron spaces
Convergence rates and structure of solutions of inverse problems with imperfect forward models
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