Sharp Quantitative Stability Estimates for Critical Points of Fractional Sobolev Inequalities
- Authors
- Chen, Haixia; Kim, Seunghyeok; Wei, Juncheng
- Issue Date
- Jun-2025
- Publisher
- Oxford University Press
- Citation
- International Mathematics Research Notices, v.2025, no.12, pp 1 - 36
- Pages
- 36
- Indexed
- SCIE
SCOPUS
- Journal Title
- International Mathematics Research Notices
- Volume
- 2025
- Number
- 12
- Start Page
- 1
- End Page
- 36
- URI
- https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/210476
- DOI
- 10.1093/imrn/rnaf156
- ISSN
- 1073-7928
1687-0247
- Abstract
- By developing a unified approach based on integral representations, we establish sharp quantitative stability estimates of the fractional and higher-order Sobolev inequalities, induced by the embedding $\dot{H}<^>{s}(\mathbb{R}<^>{n}) \hookrightarrow L<^>{2n \over n-2s}(\mathbb{R}<^>{n})$ for any $s \in (0,\frac{n}{2})$, in the critical point setting.
By developing a unified approach based on integral representations, we establish sharp quantitative stability estimates of the fractional and higher-order Sobolev inequalities, induced by the embedding H˙ s(Rn) → L 2n n−2s (Rn) for any s ∈ (0, n 2 ), in the critical point setting.
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