A three-dimensional symmetry result for a phase transition equation in the genuinely nonlocal regime

Abstract

We consider bounded solutions of the nonlocal Allen-Cahn equation (-)s u=u-u3 in R3, under the monotonicity condition ∂x3u>0 and in the genuinely nonlocal regime in which~s∈(0,12). Under the limit assumptions xn-∞ u(x',xn)=-1 and xn+∞ u(x',xn)=1, it has been recently shown that~u is necessarily 1D, i.e. it depends only on one Euclidean variable. The goal of this paper is to obtain a similar result without assuming such limit conditions. This type of results can be seen as nonlocal counterparts of the celebrated conjecture formulated by Ennio De Giorgi.