Fractional elliptic systems with critical nonlinearities

Abstract

In this paper we study positive solutions to the following nonlocal system of equations: equation* \aligned &(-)s u = α2s*|u|α-2u|v|β+f(x)\;\;in\;RN, &(-)s v = β2s*|v|β-2v|u|α+g(x)\;\;in\;RN, & u, \, v >0\, in \,RN, aligned . equation* where N>2s, α,\,β>1, α+β=2N/(N-2s), and f,\, g are nonnegative functionals in the dual space of Hs(RN). When f=0=g, we show that the ground state solution of the above system is unique. On the other hand, when f and g are nontrivial nonnegative functionals with ker(f)=ker(g), then we establish the existence of at least two different positive solutions of the above system provided that \|f\|(Hs)' and \|g\|(Hs)' are small enough. Moreover, we also provide a global compactness result, which gives a complete description of the Palais-Smale sequences of the above system.