Sharp stability for critical points of the Sobolev inequality in the absence of bubbling
Abstract
When u is close to a single Talenti bubble v of the p-Sobolev inequality, we show that equation* \|Du-Dv\|Lp(Rn)\1,p-1\ C \|- div(|Du|p-2Du)-|u|p*-2u\|W-1,q(Rn), equation* where C=C(n,p)>0. This estimate provides a sharp stability estimate for the Struwe-type decomposition in the single bubble case, generalizing the result of Ciraolo, Figalli, and Maggi CFM2018 (focusing on the case p=2) to the arbitrary p. Also, in the Sobolev setting, this answers an open problem raised by Zhou and Zou in [Remark 1.17]ZZ2023.
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