Green's functions of Paneitz and GJMS operators on hyperbolic spaces and sharp Hardy-Sobolev-Maz'ya inequalities on half spaces

Abstract

Using the Fourier analysis techniques on hyperbolic spaces and Green's function estimates, we confirm in this paper the conjecture given by the same authors in [43]. Namely, we prove that the sharp constant in the n-12-th order Hardy-Sobolev-Maz'ya inequality in the upper half space of dimension n coincides with the best n-12-th order Sobolev constant when n is odd and n≥9 (See Theorem 1.6). We will also establish a lower bound of the coefficient of the Hardy term for the k-th order Hardy-Sobolev-Maz'ya inequality in upper half space in the remaining cases of dimension n and k-th order derivatives (see Theorem 1.7). Precise expressions and optimal bounds for Green's functions of the operator -H-(n-1)24 on the hyperbolic space Bn and operators of the product form are given, where (n-1)24 is the spectral gap for the Laplacian -H on Bn. Finally, we give the precise expression and optimal pointwise bound of Green's function of the Paneitz and GJMS operators on hyperbolic space, which are of their independent interest (see Theorem 1.10).