Non-degeneracy, stability and symmetry for the fractional Caffarelli-Kohn-Nirenberg inequality

Abstract

The fractional Caffarelli-Kohn-Nirenberg inequality states that ∫Rn∫Rn (u(x)-u(y))2|x|α |x-y|n+2s |y|α d x \, d y ≥ n, s, p, α,β \|u |x|-β\|Lp2, for 0<s<\1, n/2\, 2<p<2*s, and α,β∈ R so that β-α = s - n(12 - 1p) and -2s < α < n-2s2. Continuing the program started in Ao et al. (2022), we establish the non-degeneracy and sharp quantitative stability of minimizers for α 0. Furthermore, we show that minimizers remain symmetric when α<0 for p very close to 2. Our results fit into the more ambitious goal of understanding the symmetry region of the minimizers of the fractional Caffarelli-Kohn-Nirenberg inequality. We develop a general framework to deal with fractional inequalities in Rn, striving to provide statements with a minimal set of assumptions. Along the way, we discover a Hardy-type inequality for a general class of radial weights that might be of independent interest.