☆ 4.6 Article

Convergence rates for regularization functionals with polyconvex integrands

INVERSE PROBLEMS (2017)

期刊

INVERSE PROBLEMS

卷 33, 期 8, 页码 -

出版社

IOP PUBLISHING LTD

DOI: 10.1088/1361-6420/aa7a1e

关键词

inverse problems; regularization theory; convergence rates; polyconvex functions; Bregman distance; image registration

类别

Mathematics, Applied Physics, Mathematical

资金

Austrian Science Fund (FWF) within the national research network Geometry and Simulation [S11704]
Austrian Science Fund (FWF) [P26687-N25]
Austrian Science Fund (FWF) [P 26687] Funding Source: researchfish
Austrian Science Fund (FWF) [P26687] Funding Source: Austrian Science Fund (FWF)

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摘要

Convergence rates results for variational regularization methods typically assume the regularization functional to be convex. While this assumption is natural for scalar-valued functions, it can be unnecessarily strong for vector-valued ones. In this paper we focus on regularization functionals with polyconvex integrands. Even though such functionals are nonconvex in general, it is possible to derive linear convergence rates with respect to a generalized Bregman distance, an idea introduced by Grasmair in 2010. As a case example we consider the image registration problem.

Convergence rates for regularization functionals with polyconvex integrands

期刊

INVERSE PROBLEMS

出版社

IOP PUBLISHING LTD

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Convergence rates for regularization functionals with polyconvex integrands

期刊

INVERSE PROBLEMS

出版社

IOP PUBLISHING LTD

关键词

类别

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Reagent

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