Kelei Wang
Published 2014-01-25, updated 2015-04-12Version 3
In this paper we establish an improvement of tilt-excess decay estimate for the Allen-Cahn equation, and use this to give a new proof of Savin's theorem on the uniform $C^{1,\alpha}$ regularity of flat level sets, which then implies the one dimensional symmetry of minimizers in $\mathbb{R}^n$ for $n\leq 7$. This generalizes Allard's $\varepsilon$-regularity theorem for stationary varifolds to the setting of Allen-Cahn equations.
Comments: 59 pages. Comments are welcome
Even Symmetry of Some Entire Solutions to the Allen-Cahn Equation in Two Dimensions
Semilinear integro-differential equations, II: one-dimensional and saddle-shaped solutions to the Allen-Cahn equation
The classification of four end solutions of the Allen-Cahn equation on the plane
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