A growth estimate for the planar Mumford--Shah minimizers at a tip point: An alternative proof of David--L\'eger

Abstract

Let ⊂ R2 be a bounded domain and u∈ SBV() be a local minimizer of the Mumford--Shah problem in the plane, with 0∈ Su being a tip point and B1⊂ . Then there exist absolute constants C>0 and 0<r0<1 such that |u(x)-u(0)| C r 1 2 for any \ x∈ Br \ and \ 0<r<r0. This estimate is a local version of the original one in [Proposition 10.17]DL2002. Our result is based on a dichotomy and the John structure of Su, different from the one by David--L\'eger DL2002 or Bonnet--David [Lemma 21.3]BD2001.

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