Abstract
AbstractWe show that the Caffarelli–Kohn–Nirenberg (CKN) inequality holds with a remainder term that is quartic in the distance to the set of optimizers for the full parameter range of the Felli–Schneider (FS) curve. The fourth power is best possible. This is due to the presence of non-trivial zero modes of the Hessian of the deficit functional along the FS-curve. Following an iterated Bianchi–Egnell strategy, the heart of our proof is verifying a ‘secondary non-degeneracy condition’. Our result completes the stability analysis for the CKN-inequality to leading order started by Wei and Wu. Moreover, it is the first instance of degenerate stability for non-constant optimizers and for a non-compact domain.
Funder
Directorate for Mathematical and Physical Sciences
Deutsche Forschungsgemeinschaft
Ludwig-Maximilians-Universität München
Publisher
Springer Science and Business Media LLC
Reference36 articles.
1. Aubin, T.: Problèmes isopérimétriques et espaces de Sobolev. J. Differential Geom. 11, 573–598 (1976)
2. Bianchi, G., Egnell, H.: A note on the Sobolev inequality. J. Funct. Anal. 100, 18–24 (1991)
3. Brezis, H., Lieb, E.H.: Sobolev inequalities with remainder terms. J. Funct. Anal. 62, 73–86 (1985)
4. Brigati, G., Dolbeault, J., Simonov, N.: Logarithmic Sobolev and interpolation inequalities on the sphere: constructive stability results. Ann. Inst. H. Poincaré Anal. Non Lináire, pages 1–33, Nov. 2023. https://doi.org/10.4171/AIHPC/106
5. Caffarelli, L., Kohn, R., Nirenberg, L.: First order interpolation inequalities with weights. Compos. Math. 53(3), 259–275 (1984)