Stability of Rellich-Sobolev type inequality involving Hardy term for bi-Laplacian

Abstract

For N≥ 5 and 0<μ<N-4, we first show a non-degenerate result of the extremal functions for the following Rellich-Sobolev type inequality align* ∫RN| u|2 dx -Cμ,1∫RN|∇ u|2|x|2 dx +Cμ,2∫RNu2|x|4 dx ≥ Sμ(∫RN|u|2NN-4 dx)N-4N, ∀ u∈ C∞0(RN), align* where Cμ,1, Cμ,2 and Sμ are constants depending on N and μ, which is a key ingredient in analyzing the blow-up phenomena of solutions to various elliptic equations on bounded or unbounded domains. Then by using spectral analysis combined with a compactness argument, we consider the stability of this inequality. Furthermore, we derive a remainder term inequality in the weak Lebesgue-norm sense in a subdomain with finite Lebesgue measure.