Inclusions and noninclusions of Hardy type spaces on certain nondoubling manifolds
Abstract
In this paper we establish inclusions and noninclusions between various Hardy type spaces on noncompact Riemannian manifolds M with Ricci curvature bounded from below, positive injectivity radius and spectral gap. Our first main result states that, if L is the positive Laplace-Beltrami operator on M, then the Riesz-Hardy space H1R(M) is the isomorphic image of the Goldberg type space h1(M) via the map L1/2 (I + L)-1/2, a fact that is false in Rn. Specifically, H1R(M) agrees with the Hardy type space X1/2(M) recently introduced by the the first three authors; as a consequence, we prove that h1(M) does not admit an atomic characterisation. Noninclusions are mostly proved in the special case where the manifold is a Damek-Ricci space S. Our second main result states that H1R(S), the heat Hardy space H1H(S) and the Poisson-Hardy space H1P(S) are mutually distinct spaces, a fact which is in sharp contrast to the Euclidean case, where these three spaces agree.
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