Reverse Carleson measures for Hardy spaces in the unit ball

Abstract

Let Hp=Hp(Bd) denote the Hardy space in the open unit ball Bd of Cd, d 1. We characterize the reverse Carleson measures for Hp, 1<p<∞, that is, we describe all finite positive Borel measures μ, defined on the closed ball Bd, such that \[ \|f \|Hp c \|f\|Lp(Bd,μ) \] for all f∈ Hp(Bd) C(Bd) and a universal constant c>0. Given a non-inner holomorphic function b: Bd B1, we obtain properties of the reverse Carleson measures for the de Branges-Rovnyak space H(b).