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Optimal order results for a class of regularization methods using unbounded operators.

Authors :
Nair, M.
Source :
Integral Equations & Operator Theory; Sep2002, Vol. 44 Issue 1, p79-92, 14p
Publication Year :
2002

Abstract

A class of regularization methods using unbounded regularizing operators is considered for obtaining stable approximate solutions for ill-posed operator equations. With an a posteriori as well as an a priori parameter choice strategy, it is shown that the method yields the optimal order. Error estimates have also been obtained under stronger assumptions on the generalized solution. The results of the paper unify and simplify many of the results available in the literature. For example, the optimal results of the paper include, as particular cases for Tikhonov regularization, the main result of Mair (1994) with an a priori parameter choice, and a result of Nair (1999) with an a posteriori parameter choice. Thus the observations of Mair (1994) on Tikhonov regularization of ill-posed problems involving finitely and infinitely smoothing operators is applicable to various other regularization procedures as well. Subsequent results on error estimates include, as special cases, an optimal result of Vainikko (1987) and also some recent results of Tautenhahn (1996) in the setting of Hilbert scales. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
0378620X
Volume :
44
Issue :
1
Database :
Complementary Index
Journal :
Integral Equations & Operator Theory
Publication Type :
Academic Journal
Accession number :
50558066
Full Text :
https://doi.org/10.1007/BF01197862