On the uniqueness of solutions of a nonlocal elliptic system

We consider the following elliptic system with fractional Laplacian -(-Delta)(s)u = uv(2), -(-Delta)(s) v = vu(2), u, v > 0 on R-n, where s is an element of (0, 1) and (-Delta)(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. Finally we use the method of moving planes to prove the uniqueness of the one dimensional profile, up to translation and scaling.