Eberhard Schock scite author profile

In this paper we study linear ill-posed problems Ax = y in a Hilbert space setting where instead of exact data y noisy data y δ are given satisfying y − y δ ≤ δ with known noise level δ. Regularized approximations are obtained by a general regularization scheme where the regularization parameter is chosen from Morozov's discrepancy principle. Assuming the unknown solution belongs to some general source set M we prove that the regularized approximation provides order optimal error bounds on the set M. Our results cover the special case of finitely smoothing operators A and extend recent results for infinitely smoothing operators.

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Approximate Solution of Ill-Posed Equations: Arbitrarily Slow Convergence vs. Superconvergence

Schock

1985

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Operator ideals and spaces of bilinear operators

Ramanujan

Schock

1985

Linear and Multilinear Algebra

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On the asymptotic order of accuracy of Tikhonov regularization

Schock

1984

J Optim Theory Appl

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Eberhard Schock

On the Adaptive Selection of the Parameter in Regularization of Ill-Posed Problems

Morozov's Discrepancy Principle under General Source Conditions

Approximate Solution of Ill-Posed Equations: Arbitrarily Slow Convergence vs. Superconvergence

Operator ideals and spaces of bilinear operators

On the asymptotic order of accuracy of Tikhonov regularization

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