Critical functions and blow-up asymptotics for the fractional Brezis--Nirenberg problem in low dimension

Abstract

For s ∈ (0,1) and a bounded open set ⊂ RN with N > 2s, we study the fractional Brezis--Nirenberg type minimization problem of finding S(a) := ∈f ∫ RN |(-)s/2 u|2 + ∫ a u2( ∫ u2NN-2s )N-2sN, where the infimum is taken over all functions u ∈ Hs( RN) that vanish outside . The function a is assumed to be critical in the sense of Hebey and Vaugon. For low dimensions N ∈ (2s, 4s), we prove that the Robin function φa satisfies ∈fx ∈ φa(x) = 0, which extends a result obtained by Druet for s = 1. In dimensions N ∈ (8s/3, 4s), we then study the asymptotics of the fractional Brezis--Nirenberg energy S(a + V) for some V ∈ L∞() as 0+. We give a precise description of the blow-up profile of (almost) minimizing sequences and characterize the concentration speed and the location of concentration points.