Spectral decompositions using one-homogeneous functionals

Martin Burger; Guy Gilboa; Michael Moeller; Lina Eckardt; Daniel Cremers

doi:10.1137/15M1054687

Spectral decompositions using one-homogeneous functionals

Martin Burger
, Guy Gilboa
, Michael Moeller
, Lina Eckardt
, Daniel Cremers

Informatics 9 - Chair of Computer Vision and Artificial Intelligence

University of Münster
Technion - Israel Institute of Technology
Technical University of Munich

Research output: Contribution to journal › Article › peer-review

60 Scopus citations

Abstract

This paper discusses the use of absolutely one-homogeneous regularization functionals in a variational, scale space, and inverse scale space setting to define a nonlinear spectral decomposition of input data. We present several theoretical results that explain the relation between the different definitions. Additionally, results on the orthogonality of the decomposition, a Parseval-type identity, and the notion of generalized (nonlinear) eigenvectors closely link our nonlinear multiscale decompositions to the well-known linear filtering theory. Numerical results are used to illustrate our findings.

Original language	English
Pages (from-to)	1374-1408
Number of pages	35
Journal	SIAM Journal on Imaging Sciences
Volume	9
Issue number	3
DOIs	https://doi.org/10.1137/15M1054687
State	Published - 8 Sep 2016

Keywords

Convex regularization
Nonlinear eigenfunctions
Nonlinear spectral decomposition
Total variation

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10.1137/15M1054687

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title = "Spectral decompositions using one-homogeneous functionals",

abstract = "This paper discusses the use of absolutely one-homogeneous regularization functionals in a variational, scale space, and inverse scale space setting to define a nonlinear spectral decomposition of input data. We present several theoretical results that explain the relation between the different definitions. Additionally, results on the orthogonality of the decomposition, a Parseval-type identity, and the notion of generalized (nonlinear) eigenvectors closely link our nonlinear multiscale decompositions to the well-known linear filtering theory. Numerical results are used to illustrate our findings.",

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AB - This paper discusses the use of absolutely one-homogeneous regularization functionals in a variational, scale space, and inverse scale space setting to define a nonlinear spectral decomposition of input data. We present several theoretical results that explain the relation between the different definitions. Additionally, results on the orthogonality of the decomposition, a Parseval-type identity, and the notion of generalized (nonlinear) eigenvectors closely link our nonlinear multiscale decompositions to the well-known linear filtering theory. Numerical results are used to illustrate our findings.

KW - Convex regularization

KW - Nonlinear eigenfunctions

KW - Nonlinear spectral decomposition

KW - Total variation

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ER -

Spectral decompositions using one-homogeneous functionals

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Keywords

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