On stable solutions for boundary reactions: a De Giorgi-type result in dimension 4+1

Abstract

We prove that every bounded stable solution of \[ (-)1/2 u + f(u) =0 in R3\] is a 1D profile, i.e., u(x)= φ(e· x) for some e∈ S2, where φ: R R is a nondecreasing bounded stable solution in dimension one. This proves the De Giorgi conjecture in dimension 4 for the half-Laplacian. Equivalently, we give a positive answer to the De Giorgi conjecture for boundary reactions in Rd+1+= Rd+1 \xd+1≥ 0\ when d = 4, by proving that all critical points of ∫\xd+1≥ 0\ 12 |∇ U|2 \,dx\, dxd+1 + ∫\xd+1=0\ 1 4 (1-U2)2 \,dx that are monotone in Rd (that is, up to a rotation, ∂xd U>0) are one dimensional. Our result is analogue to the fact that stable embedded minimal surfaces in R3 are planes. Note that the corresponding result about stable solutions to the classical Allen-Cahn equation (namely, when the half-Laplacian is replaced by the classical Laplacian) is still open.