On composition ideals and dual ideals of bounded holomorphic mappings

Abstract

Applying a linearization theorem due to J. Mujica, we study the ideals of bounded holomorphic mappings H∞ generated by composition with an operator ideal I. The bounded-holomorphic dual ideal of I is introduced and its elements are characterized as those that admit a factorization through Idual. For complex Banach spaces E and F, we also analyze new ideals of bounded holomorphic mappings from an open subset U⊂eq E to F such as p-integral holomorphic mappings and p-nuclear holomorphic mappings with 1≤ p<∞. We prove that every p-integral (p-nuclear) holomorphic mapping from U to F has relatively weakly compact (compact) range.