A Liouville type theorem for Lane-Emden systems involving the fractional Laplacian

Abstract

We establish a Liouville type theorem for the fractional Lane-Emden system: eqnarray* \arrayl@ l (-)α u=vq& in\,\,N,\\ (-)α v=up& in\,\,N, array . eqnarray* where α∈(0,1) , N>2α and p,q are positive real numbers and in an appropriate new range. To prove our result we will use the local realization of fractional Laplacian, which can be constructed as Dirichlet-to-Neumann operator of a degenerate elliptic equation in the spirit of Caffarelli and Silvestre CS. Our proof is based on a monotonicity argument for suitable transformed functions and the method of moving planes in an infinity half cylinder based on some maximum principles which obtained by some barrier functions and a coupling argument using fractional Sobolev trace inequality.