Harmonic Bergman spaces, the Poisson equation and the dual of Hardy-type spaces on certain noncompact manifolds

Abstract

In this paper we consider a complete connected noncompact Riemannian manifold M with bounded geometry and spectral gap. We realize the dual space Yh(M) of the Hardy-type space Xh(M), introduced in a previous paper of the authors, as the class of all locally square integrable functions satisfying suitable BMO-like conditions, where the role of the constants is played by the space of global k-quasi-harmonic functions. Furthermore we prove that Yh(M) is also the dual of the space Xkfin(M) of finite linear combination of Xk-atoms. As a consequence, if Z is a Banach space and T is a Z-valued linear operator defined on Xkfin(M), then T extends to a bounded operator from Xk(M) to Z if and only if it is uniformly bounded on Xk-atoms. To obtain these results we prove the global solvability of the generalized Poisson equation Lku=f with f in L2loc(M) and we study some properties of generalized Bergman spaces of harmonic functions on geodesic balls.