Parameter choice in Banach space regularization under variational inequalities

Hofmann, Bernd, Mathé, Peter

17 April 2012

The authors study parameter choice strategies for Tikhonov regularization of nonlinear ill-posed problems in Banach spaces. The effectiveness of any parameter choice for obtaining convergence rates depend on the interplay of the solution smoothness and the nonlinearity structure, and it can be expressed concisely in terms of variational inequalities. Such inequalities are link conditions between the penalty term, the norm misfit and the corresponding error measure. The parameter choices under consideration include an a priori choice, the discrepancy principle as well as the Lepskii principle. For the convenience of the reader the authors review in an appendix a few instances where the validity of a variational inequality can be established.

Nichtlineare inkorrekte Probleme

inkorrekt gestellte Probleme

Banachraum-Regularisierung

Konvergenzraten

Nonlinear ill-posed problems

Banach space regularization

convergence rates

ddc:510

Regularisierung

Tichonov-Regularisierung

Parameter choice in Banach space regularization under variational inequalities

Hofmann, Bernd, Mathé, Peter

January 2012

The authors study parameter choice strategies for Tikhonov regularization of nonlinear ill-posed problems in Banach spaces. The effectiveness of any parameter choice for obtaining convergence rates depend on the interplay of the solution smoothness and the nonlinearity structure, and it can be expressed concisely in terms of variational inequalities. Such inequalities are link conditions between the penalty term, the norm misfit and the corresponding error measure. The parameter choices under consideration include an a priori choice, the discrepancy principle as well as the Lepskii principle. For the convenience of the reader the authors review in an appendix a few instances where the validity of a variational inequality can be established.

info:eu-repo/classification/ddc/510

ddc:510

The impact of a curious type of smoothness conditions on convergence rates in l1-regularization

Bot, Radu Ioan, Hofmann, Bernd

31 January 2013

Tikhonov-type regularization of linear and nonlinear ill-posed problems in abstract spaces under sparsity constraints gained relevant attention in the past years. Since under some weak assumptions all regularized solutions are sparse if the l1-norm is used as penalty term, the l1-regularization was studied by numerous authors although the non-reflexivity of the Banach space l1 and the fact that such penalty functional is not strictly convex lead to serious difficulties. We consider the case that the sparsity assumption is narrowly missed. This means that the solutions may have an infinite number of nonzero but fast decaying components. For that case we formulate and prove convergence rates results for the l1-regularization of nonlinear operator equations. In this context, we outline the situations of Hölder rates and of an exponential decay of the solution components.

l1-Regularisierung

Konvergenzraten

Quellbedingungen

nonlinear ill-posed problems

Tikhonov-type regularization

l1-regularization

sparsity constraints

convergence rates

solution decay

variational inequalities

source conditions

discrepancy principle

ddc:510

ddc:519

Regularisierung

Konvergenz

Preconditioned Newton methods for ill-posed problems / Vorkonditionierte Newton-Verfahren für schlecht gestellte Probleme

Langer, Stefan

21 June 2007

No description available.

510 Mathematik

Mathematics and Computer Science

31.76

31.80

31.45

33.06

EEHA 520: Ill-posed problems

EGFF 220: Ill-posedness

electromagnetic theory: General}

The impact of a curious type of smoothness conditions on convergence rates in l1-regularization

Bot, Radu Ioan, Hofmann, Bernd

January 2013

Tikhonov-type regularization of linear and nonlinear ill-posed problems in abstract spaces under sparsity constraints gained relevant attention in the past years. Since under some weak assumptions all regularized solutions are sparse if the l1-norm is used as penalty term, the l1-regularization was studied by numerous authors although the non-reflexivity of the Banach space l1 and the fact that such penalty functional is not strictly convex lead to serious difficulties. We consider the case that the sparsity assumption is narrowly missed. This means that the solutions may have an infinite number of nonzero but fast decaying components. For that case we formulate and prove convergence rates results for the l1-regularization of nonlinear operator equations. In this context, we outline the situations of Hölder rates and of an exponential decay of the solution components.

info:eu-repo/classification/ddc/510

ddc:510

info:eu-repo/classification/ddc/519

ddc:519

Regularisierung; Konvergenz