Small Bergman-Orlicz and Hardy-Orlicz spaces, and their composition operators

Abstract

We show that the weighted Bergman-Orlicz space A\α coincides with some weighted Banach space of holomorphic functions if and only if the Orlicz function satisfies the so-called 2--condition. In addition we prove that this condition characterizes those A\α on which every composition operator is bounded or order bounded into the Orlicz space L\α. This provides us with estimates of the norm and the essential norm of composition operators on such spaces. We also prove that when satisfies the 2--condition, a composition operator is compact on A\α if and only if it is order bounded into the so-called Morse-Transue space M\α. Our results stand in the unit ball of CN.