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arxiv: 1903.02349 · v2 · pith:F672F2LBnew · submitted 2019-03-06 · 🧮 math.AP · cs.NA· math.NA

Approximation of the Mumford-Shah Functional by Phase Fields of Bounded Variation

classification 🧮 math.AP cs.NAmath.NA
keywords phaseapproximationfieldfunctionvariationboundedfieldsfunctional
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In this paper we introduce a new phase field approximation of the Mumford-Shah functional similar to the well-known one from Ambrosio and Tortorelli. However, in our setting the phase field is allowed to be a function of bounded variation, instead of an $H^1$-function. In the context of image segmentation, we also show how this new approximation can be used for numerical computations, which contains a total variation minimization of the phase field variable, as it appears in many problems of image processing. A comparison to the classical Ambrosio-Tortorelli approximation, where the phase field is an $H^1$-function, shows that the new model leads to sharper phase fields.

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