Blow-up rate and local uniqueness for fractional Schr\"odinger equations with nearly critical growth

Abstract

We study quantitative aspects and concentration phenomena for ground states of the following nonlocal Schr\"odinger equation (-)s u+V(x)u= u2s*-1- \ \ in\ \ RN, where >0, s∈ (0,1), 2*s:=2NN-2s, N>4s. We show that the ground state u blows up and precisely with the following rate \|u\|L∞(RN) -N-2s4s, as ε→ 0+. We also localize the concentration points and, in the case of radial potentials V, we prove local uniqueness of sequences of ground states which exhibit a concentrating behavior.