On the uniqueness of solutions of an nonlocal elliptic system
arXiv:1403.2346
Abstract
We consider the following elliptic system with fractional laplacian $$ -(-Î)^su=uv^2,\ \ -(-Î)^sv=vu^2,\ \ u,v>0 \ \mbox{on}\ \R^n,$$ where $s\in(0,1)$ and $(-Î)^s$ is the $s$-Lapalcian. We first prove that all positive solutions must have polynomial bound. Then we use the Almgren monotonicity formula to perform a blown-down analysis to $s$-harmonic functions. Finally we use the method of moving planes to prove the uniqueness of the one dimensional profile, up to translation and scaling.
35 pages