Bivariate Hardy-Sobolev Inequality and Its Sharp Stability

Abstract

This paper establishes a bivariate Hardy-Sobolev inequality. Let ⊂ RN (N ≥ 3) be an open domain, s ∈ (0,2), α > 1, β > 1 with α + β = 2*(s), and ∈ R. For any functions u, v ∈ D01,2(), we prove the inequality: multline* ∫ |∇ u|2 \, dx + ∫ |∇ v|2 \, dx Sα,β,λ,μ() ( ∫ ( λ |u|2*(s)|x|s + μ |v|2*(s)|x|s + 2*(s) |u|α |v|β|x|s )\, dx )22*(s). multline* We derive the best constant Sα,β,λ,μ() and characterize the set of minimizers. Moreover, for = RN and > 0, we obtain sharp stability results for nonnegative functions.