Semiclassical states of a linearly coupled critical fractional Schr\"odinger system

Abstract

This paper focuses on the linearly coupled critical fractional Schr\"odinger system equation* cases ε2s(-)s u +a(x)u=up+λ v &in\ RN,\\ ε2s(-)s v +b(x)v=v2s*-1+λ u &in\ RN, cases equation* where N>2s, s∈(0,1), p∈(1,2s*), ε and λ are positive parameters, a,b∈ C(RN) are positive potentials, and (-)s is the fractional Laplacian operator. Under certain assumptions on a and λ, we obtain the existence, decay estimates and concentration property of positive vector ground states for small ε. Furthermore, under an additional assumption on potentials a and b, we consider the multiplicity of positive vector solutions for small ε, which turn out to have similar decay estimate and concentration property to those of the ground state for small ε.