Journal
MULTISCALE MODELING & SIMULATION
Volume 6, Issue 2, Pages 366-395Publisher
SIAM PUBLICATIONS
DOI: 10.1137/060660564
Keywords
scale space methods; total variation; Bregman distance
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In this paper we analyze iterative regularization with the Bregman distance of the total variation seminorm. Moreover, we prove existence of a solution of the corresponding flow equation as introduced in [ M. Burger, G. Gilboa, S. Osher, and J. Xu, Commun. Math. Sci., 4 ( 2006), pp. 179 - 212] in a functional analytical setting using methods from convex analysis. The results are generalized to variational denoising methods with Lp- norm. t- to- data terms and Bregman distance regularization terms. For the associated. ow equations well- posedness is derived using recent results on metric gradient. ows from [ L. Ambrosio, N. Gigli, and G. Savar ' e, Gradient Flows in Metric Spaces and in the Space of Probability Measures, Lectures in Mathematics ETH Z urich, Birkh auser Verlag, Basel, 2005]. In contrast to previous work the results of this paper apply for the analysis of variational denoising methods with the Bregman distance under adequate noise assumptions. Aside from the theoretical results we introduce a level set technique based on Bregman distance regularization for denoising of surfaces and demonstrate the e. ciency of this method.
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