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On De Giorgi Conjecture in Dimension $N \geq 9$

arXiv:0806.3141

Abstract

A celebrated conjecture due to De Giorgi states that any bounded solution of the equation $Δu + (1-u^2) u = 0 \hbox{in} \R^N $ with $\pp_{y_N}u >0$ must be such that its level sets $\{u=\la\}$ are all hyperplanes, {\em \bf at least} for dimension $N\le 8$. A counterexample for $N\ge 9$ has long been believed to exist. Based on a minimal graph $Γ$ which is not a hyperplane, found by Bombieri, De Giorgi and Giusti in $\R^N$, $N\ge 9$, we prove that for any small $α>0$ there is a bounded solution $u_α(y)$ with $\pp_{y_N}u_α>0$, which resembles $ \tanh (\frac t{\sqrt{2}}) $, where $t=t(y)$ denotes a choice of signed distance to the blown-up minimal graph $Γ_α:= α^{-1}Γ$. This solution constitutes a counterexample to De Giorgi conjecture for $N\ge 9$.

67 pages