Flat level sets of Allen-Cahn equation in half-space
Abstract
We prove a half-space Bernstein theorem for Allen-Cahn equation. More precisely, we show that every solution u of the Allen-Cahn equation in the half-space Rn+:=\(x1,x2,·s,xn)∈Rn:\,x1≥ 0\ with |u|≤ 1, boundary value given by the restriction of a one-dimensional solution on \x1=0\ and monotone condition ∂xnu>0 as well as limiting condition xn∞u(x',xn)= 1 must itself be one-dimensional, and the parallel flat level sets and \x1=0\ intersect at the same fixed angle in (0, π2].
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