Comparison of spaces of Hardy type for the Ornstein-Uhlenbeck operator

Abstract

Denote by g the Gauss measure on Rn and by L the Ornstein-Uhlenbeck operator. In this paper we introduce a local Hardy space h1(g) of Goldberg type and we compare it with the Hardy space H1(g) introduced in a previous paper by Mauceri and Meda. We show that for each each positive r the imaginary powers of the operator rI+L are unbounded from h1(g) to L1(g). This result is in sharp contrast both with the fact that the imaginary powers are bounded from H1(g to L1(g), and with the fact that for the Euclidean laplacian and the Lebesgue measure λ) the imaginary powers of rI- are bounded from the Goldberg space h1(λ) to L1(λ). We consider also the case of Riemannian manifolds M with Riemannian measure m. We prove that, under certain geometric assumptions on M, an operator T, bounded on L2(m), and with a kernel satisfying certain analytic assumptions, is bounded from H1(m) to L1(m) if and only if it is bounded from h1(m) to L1(m). Here H1(m) denotes the Hardy space on locally doubling metric measure spaces introduced by the authors in arXiv:0808.0146, and h1(m) is a Goldberg type Hardy space on M, equivalent to a space recently introduced by M. Taylor. The case of translation invariant operators on homogeneous trees is also considered.