Camillo De Lellis, Matteo Focardi
Published 2015-02-08Version 1
We prove an $\varepsilon$-regularity theorem at the endpoint of connected arcs for $2$-dimensional Mumford-Shah minimizers. In particular we show that, if in a given ball $B_r (x)$ the jump set of a given Mumford-Shah minimizer is sufficiently close, in the Hausdorff distance, to a radius of $B_r (x)$, then in a smaller ball the jump set is a connected arc which terminates at some interior point $y_0$ and it is $C^{1,\alpha}$ up to $y_0$.
On the Endpoint Regularity in Onsager's Conjecture
Endpoint regularity for $2d$ Mumford-Shah minimizers: On a theorem of Andersson and Mikayelyan
Extensions of Schoen--Simon--Yau and Schoen--Simon theorems via iteration à la De Giorgi
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