The Duren-Carleson theorem in tube domains over symmetric cones

Abstract

In the setting of tube domains over symmetric cones, T, we study the characterization of the positive Borel measures μ for which the Hardy space Hp is continuously embedded into the Lebesgue space Lq (T, dμ), 0<p<q<∞. Extending a result due to Blasco for the unit disc, we reduce the problem to standard measures. We obtain that a Hardy space Hp, 1≤ p < ∞, embeds continuously in weighted Bergman spaces with larger exponents. Finally we use this result to characterize multipliers from H2m to Bergman spaces for every positive integer m.