Stability of Caffarelli-Kohn-Nirenberg inequality

Abstract

In this paper, we consider the Caffarelli-Kohn-Nirenberg (CKN) inequality: eqnarray* (∫ RN|x|-b(p+1)|u|p+1dx)2p+1≤ Ca,b,N∫ RN|x|-2a|∇ u|2dx eqnarray* where N≥3, a<N-22, a≤ b≤ a+1 and p=N+2(1+a-b)N-2(1+a-b). It is well-known that up to dilations τN-22-au(τ x) and scalar multiplications Cu(x), the CKN inequality has a unique extremal function W(x) which is positive and radially symmetric in the parameter region bFS(a)≤ b<a+1 with a<0 and a≤ b<a+1 with a≥0 and a+b>0, where bFS(a) is the Felli-Schneider curve. We prove that in the above parameter region the following stabilities hold: enumerate [(1)] stability of CKN inequality in the functional inequality setting distD1,2a2(u, Z)\|u\|2D1,2a( RN)-Ca,b,N-1\|u\|2Lp+1(|x|-b(p+1), RN) where Z= \ c Wτ c∈\0\, τ>0\; [(2)] stability of CKN inequality in the critical point setting (in the class of nonnegative functions) eqnarray* distDa1,2(u, Z0)\ &(u), p>2 or =1,\\ &(u)|(u)|12, p=2 and ≥2,\\ &(u)p2, 1<p<2 and ≥2, . eqnarray* where (u)=\|div(|x|-a∇ u)+|x|-b(p+1)|u|p-1u\|(D1,2a)' and Z0=\(Wτ1,Wτ2,·s,Wτ) τi>0\.

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