On the sharp quantitative stability of critical points of the Hardy-Littlewood-Sobolev inequality in Rn with n≥3

Abstract

Assume n≥3 and u∈ H1(Rn). Recently, Piccione, Yang and Zhao Piccione-Yang-Zhao established a nonlocal version of Struwe's decomposition in Struwe-1984, i.e., if (u):=\| u+Dn,α∫Rn|u|pα(y) |x-y|αdy |u|pα-2 u\|H-1 → 0 and u≥ 0, then dist(u,T) 0, where dist(u,T) denotes the H1(Rn)-distance of u from the manifold of sums of Talenti bubbles. In this paper, we establish the nonlocal version of the quantitative estimates of Struwe's decomposition in Ciraolo, Figalli and Maggi CFM for one bubble and n≥3, Figalli and Glaudo Figalli-Glaudo2020 for 3≤ n≤5 and Deng, Sun and Wei DSW for n≥6 and two or more bubbles. We prove that for n≥ 3 and 0<α<n, \[dist (u,T)≤ Ccases (u)| (u)|12&if \,\, n≥ 6, \,\, ≥2 \,\, and \,\, α=n+22, \\ (u) &for any other cases,cases\] where denotes the number of bubbles. Furthermore, we show that this inequality is sharp for n≥ 6 and α=n+22. It should be emphasized that, in our paper, we have developed new techniques to deal with the strong singular case 4<α<n, which can not be handled by reduction methods in previous works. We believe that our method can also be applied to other problems related to the physically interesting Hartree equation.