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Main Authors: Hofmann, Bernd, Hofmann, Christopher, Mathé, Peter, Plato, Robert
Format: Preprint
Published: 2020
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Online Access:https://arxiv.org/abs/2012.11216
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_version_ 1866913317313839104
author Hofmann, Bernd
Hofmann, Christopher
Mathé, Peter
Plato, Robert
author_facet Hofmann, Bernd
Hofmann, Christopher
Mathé, Peter
Plato, Robert
contents The analysis of Tikhonov regularization for nonlinear ill-posed equations with smoothness promoting penalties is an important topic in inverse problem theory. With focus on Hilbert scale models, the case of oversmoothing penalties, i.e., when the penalty takes an infinite value at the true solution gained increasing interest. The considered nonlinearity structure is as in the study B. Hofmann and P. Mathé. Tikhonov regularization with oversmoothing penalty for non-linear ill-posed problems in Hilbert scales. Inverse Problems, 2018. Such analysis can address two fundamental questions. When is it possible to achieve order optimal reconstruction? How to select the regularization parameter? The present study complements previous ones by two main facets. First, an error decomposition into a smoothness dependent and a (smoothness independent) noise propagation term is derived, covering a large range of smoothness conditions. Secondly, parameter selection by balancing principles is presented. A detailed discussion, covering some history and variations of the parameter choice by balancing shows under which conditions such balancing principles yield order optimal reconstruction. A numerical case study, based on some exponential growth model, provides additional insights.
format Preprint
id arxiv_https___arxiv_org_abs_2012_11216
institution arXiv
publishDate 2020
record_format arxiv
spellingShingle Nonlinear Tikhonov regularization in Hilbert scales with oversmoothing penalty: inspecting balancing principles
Hofmann, Bernd
Hofmann, Christopher
Mathé, Peter
Plato, Robert
Numerical Analysis
65J22, 34A55
The analysis of Tikhonov regularization for nonlinear ill-posed equations with smoothness promoting penalties is an important topic in inverse problem theory. With focus on Hilbert scale models, the case of oversmoothing penalties, i.e., when the penalty takes an infinite value at the true solution gained increasing interest. The considered nonlinearity structure is as in the study B. Hofmann and P. Mathé. Tikhonov regularization with oversmoothing penalty for non-linear ill-posed problems in Hilbert scales. Inverse Problems, 2018. Such analysis can address two fundamental questions. When is it possible to achieve order optimal reconstruction? How to select the regularization parameter? The present study complements previous ones by two main facets. First, an error decomposition into a smoothness dependent and a (smoothness independent) noise propagation term is derived, covering a large range of smoothness conditions. Secondly, parameter selection by balancing principles is presented. A detailed discussion, covering some history and variations of the parameter choice by balancing shows under which conditions such balancing principles yield order optimal reconstruction. A numerical case study, based on some exponential growth model, provides additional insights.
title Nonlinear Tikhonov regularization in Hilbert scales with oversmoothing penalty: inspecting balancing principles
topic Numerical Analysis
65J22, 34A55
url https://arxiv.org/abs/2012.11216