Explicit Formulas of Fractional GJMS operators on hyperbolic spaces and sharp fractional Poincar\'e-Sobolev and Hardy-Sobolev-Maz'ya inequalities

Abstract

Using the scattering theory on the hyperbolic space Hn, we give the explicit formulas of the fractional GJMS operators Pγ for all γ∈(0,n2) on Hn.These Pγ for γ∈(0,n2) are neither conformal to the fractional Laplacians on Rn+ nor on Bn in Rn though Pγ are conformal to (-)γ via half space model and ball model of hyperbolic spaces when γ∈N. To circumvent this, we introduce another family of fractional operators Pγ on Hn which are conformal to the fractional Laplacians on Rn+ and Bn. It is worthwhile to note that Pγ =Pγ unless γ is an integer. We establish the fractional Poincar\'e-Sobolev inequalities associated with both Pγ and Pγ on Hn. In particular, when n≥ 3 and n-12≤ γ<n2, we prove that the sharp constants in the γ-th order of Poincar\'e-Sobolev inequalities on the hyperbolic space associated with Pγ and Pγ coincide with the best γ-th order Sobolev constant in the n-dimensional Euclidean space Rn. We also establish fractional Hardy-Sobolev-Maz'ya inequality on Rn+ and Bn and prove that the sharp constants in the γ-th order Hardy-Sobolev-Maz'ya inequalities on half space Rn+ and unit ball Bn are the same as the best γ-th order Sobolev constants in Rn when n≥ 3 and n-12≤ γ<n2. Our methods crucially rely on the Helgason-Fourier analysis on hyperbolic spaces and delicate analysis of special functions.

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