We will study some linear topological properties of Hardy space H
1 associated to solutions of the Laplace-Beltrami operator or more general elliptic operators on a smoothly bounded strongly pseudoconvex domain endowed with the Bergman metric. In particular, we characterize such Hardy spaces in terms of diffusions and non-isotropic atoms. Consequently we see that the dual space of H
1 is equivalent to the non-isotropic BMO space and that H
1 is isomorphic to the classical Hardy space on the open unit disc in the plane. As a corollary we also prove that the Hardy space H
1 of holomorphic functions on a strongly pseudoconvex domain is isomorphic to the classical one on the open unit disc, as conjectured by P. Wojtaszczyk.
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