Abstract
In this paper we consider the method of Tikhonov regularization in Hilbert scales for finding solutions q* of ill-posed linear and nonlinear operator equations A(q) = z, which consists in minimizing the functional Jα(q) = ‖A(q) - zδ‖2 + α ‖q − −q‖ 25 . Here zδ are the available perturbed data with ‖z − zδ ≤ δ, q is a suitable approximation of q* and ‖ · ‖, is the norm in a Hilbert scale Qs. Assuming ‖A(q) − A(q*)‖ [ ≈ ‖q − q*‖−a and q* − q ∈ Q2γ for some a ≥ 0 and γ ≥ 0 we discuss questions of the appropriate choice of the norm ‖ · ‖, and the regularization parameter α > 0. We prove that the choice of the regularization parameter by Morozov's discrepancy principle leads to optimal convergence rates if 2γ ∈ [s, 2s+ a] and discuss convergence rate results for the case 2γ ∉[s, 2s + a].
Keywords
- Regularization Parameter
- Tikhonov Regularization
- Parameter Choice
- Optimal Convergence Rate
- Nonlinear Operator Equation
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© 1993 Springer-Verlag
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Tautenhahn, U. (1993). Optimal parameter choice for Tikhonov regularization in Hilbert scales. In: Päivärinta, L., Somersalo, E. (eds) Inverse Problems in Mathematical Physics. Lecture Notes in Physics, vol 422. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-57195-7_28
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DOI: https://doi.org/10.1007/3-540-57195-7_28
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