Bregman distances in inverse problems and partial differential equations

Burger M (2016)


Publication Type: Book chapter / Article in edited volumes

Publication year: 2016

Publisher: Springer International Publishing

Edited Volumes: Advances in Mathematical Modeling, Optimization, and Optimal Control

Series: Springer Optimization and Its Applications

Pages Range: 3-33

DOI: 10.1007/978-3-319-30785-5_2

Abstract

The aim of this paper is to provide an overview of recent development related to Bregman distances outside its native areas of optimization and statistics. We discuss approaches in inverse problems and image processing based on Bregman distances, which have evolved to a standard tool in these fields in the last decade. Moreover, we discuss related issues in the analysis and numerical analysis of nonlinear partial differential equations with a variational structure. For such problems Bregman distances appear to be of similar importance, but are currently used only in a quite hidden fashion. We try to work out explicitly the aspects related to Bregman distances, which also lead to novel mathematical questions and may also stimulate further research in these areas.

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APA:

Burger, M. (2016). Bregman distances in inverse problems and partial differential equations. In J.Hiriard-Urrurty, A.Korytowski, H.Maurer, M.Szymkat (Eds.), Advances in Mathematical Modeling, Optimization, and Optimal Control. (pp. 3-33). Springer International Publishing.

MLA:

Burger, Martin. "Bregman distances in inverse problems and partial differential equations." Advances in Mathematical Modeling, Optimization, and Optimal Control. Ed. J.Hiriard-Urrurty, A.Korytowski, H.Maurer, M.Szymkat, Springer International Publishing, 2016. 3-33.

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