EXISTENCE OF POSITIVE SOLUTIONS FOR FRACTIONAL LAPLACIAN SYSTEMS WITH CRITICAL GROWTH

In this article, we show the existence of positive solution to the nonlocal system (-delta)(s) u + a(x)u = 1/2(s)* H-u (u, v) in R-N, (-delta)(s) u + b(x)v = 1/2(s)* H-v (u, v) in R-N, u, v > 0 in R-N, u, v is an element of D-s,D-2 (R-N). We also prove a global compactness result for the associated energy functional similar to that due to Struwe in [26]. The basic tools are some information from a limit system with a(x) = b(x) = 0, a variant of the Lion's principle of concentration and compactness for fractional systems, and Brouwer degree theory.