A general approach to regularizing inverse problems with regional data using Slepian wavelets*www.geomathematics-siegen.de and www.frederik.net. (30th November 2017)
- Record Type:
- Journal Article
- Title:
- A general approach to regularizing inverse problems with regional data using Slepian wavelets*www.geomathematics-siegen.de and www.frederik.net. (30th November 2017)
- Main Title:
- A general approach to regularizing inverse problems with regional data using Slepian wavelets*www.geomathematics-siegen.de and www.frederik.net
- Authors:
- Michel, Volker
Simons, Frederik J - Abstract:
- Abstract: Slepian functions are orthogonal function systems that live on subdomains (for example, geographical regions on the Earth's surface, or bandlimited portions of the entire spectrum). They have been firmly established as a useful tool for the synthesis and analysis of localized (concentrated or confined) signals, and for the modeling and inversion of noise-contaminated data that are only regionally available or only of regional interest. In this paper, we consider a general abstract setup for inverse problems represented by a linear and compact operator between Hilbert spaces with a known singular-value decomposition (svd). In practice, such an svd is often only given for the case of a global expansion of the data (e.g. on the whole sphere) but not for regional data distributions. We show that, in either case, Slepian functions (associated to an arbitrarily prescribed region and the given compact operator) can be determined and applied to construct a regularization for the ill-posed regional inverse problem. Moreover, we describe an algorithm for constructing the Slepian basis via an algebraic eigenvalue problem. The obtained Slepian functions can be used to derive an svd for the combination of the regionalizing projection and the compact operator. As a result, standard regularization techniques relying on a known svd become applicable also to those inverse problems where the data are regionally given only. In particular, wavelet-based multiscale techniques can beAbstract: Slepian functions are orthogonal function systems that live on subdomains (for example, geographical regions on the Earth's surface, or bandlimited portions of the entire spectrum). They have been firmly established as a useful tool for the synthesis and analysis of localized (concentrated or confined) signals, and for the modeling and inversion of noise-contaminated data that are only regionally available or only of regional interest. In this paper, we consider a general abstract setup for inverse problems represented by a linear and compact operator between Hilbert spaces with a known singular-value decomposition (svd). In practice, such an svd is often only given for the case of a global expansion of the data (e.g. on the whole sphere) but not for regional data distributions. We show that, in either case, Slepian functions (associated to an arbitrarily prescribed region and the given compact operator) can be determined and applied to construct a regularization for the ill-posed regional inverse problem. Moreover, we describe an algorithm for constructing the Slepian basis via an algebraic eigenvalue problem. The obtained Slepian functions can be used to derive an svd for the combination of the regionalizing projection and the compact operator. As a result, standard regularization techniques relying on a known svd become applicable also to those inverse problems where the data are regionally given only. In particular, wavelet-based multiscale techniques can be used. An example for the latter case is elaborated theoretically and tested on two synthetic numerical examples. … (more)
- Is Part Of:
- Inverse problems. Volume 33:Number 12(2017:Dec.)
- Journal:
- Inverse problems
- Issue:
- Volume 33:Number 12(2017:Dec.)
- Issue Display:
- Volume 33, Issue 12 (2017)
- Year:
- 2017
- Volume:
- 33
- Issue:
- 12
- Issue Sort Value:
- 2017-0033-0012-0000
- Page Start:
- Page End:
- Publication Date:
- 2017-11-30
- Subjects:
- ill-posed problem -- inverse problem -- regional data -- regularization -- singular-value decomposition -- Slepian function -- wavelet
Inverse problems (Differential equations) -- Periodicals
515.357 - Journal URLs:
- http://iopscience.iop.org/0266-5611 ↗
http://ioppublishing.org/ ↗ - DOI:
- 10.1088/1361-6420/aa9909 ↗
- Languages:
- English
- ISSNs:
- 0266-5611
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - BLDSS-3PM
British Library STI - ELD Digital store - Ingest File:
- 11495.xml