Minimal energy solutions to the fractional Lane-Emden system, I: Existence and singularity formation

Abstract

This is the first of two papers which study asymptotic behavior of minimal energy solutions to the fractional Lane-Emden system in a smooth bounded domain \[(-)s u = vp, (-)s v = uq in and u = v = 0 on for 0 < s < 1\] under the assumption that the subcritical pair (p,q) approaches to the critical Sobolev hyperbola. If p = 1, the above problem is reduced to the subcritical higher-order fractional Lane-Emden equation with the Navier boundary condition \[(-)s u = un+2sn-2s- in and u = (-)s 2 u = 0 for 1 < s < 2.\] The main objective of this paper is to deduce the existence of minimal energy solutions, and to examine their (normalized) pointwise limits provided that is convex. As a by-product of our study, a new approach for the existence of an extremal function for the Hardy-Littlewood-Sobolev inequality is provided.