Weighted holomorphic mappings associated with p-compact type sets

Abstract

Given an open subset U of a complex Banach space E, a weight v on U, and a complex Banach space F, let H∞v(U,F) denote the Banach space of all weighted holomorphic mappings f U F, under the weighted supremum norm \|f\|v:=\v(x)\|f(x)\| x∈ U\. In this paper, we introduce and study the classes of weighted holomorphic mappings H∞vKp(U,F) (resp., H∞vKwp(U,F) and H∞vKup(U,F)) for which the set (vf)(U) is relatively p-compact (resp., relatively weakly p-compact and relatively unconditionally p-compact). We prove that these mapping classes are characterized by p-compact (resp., weakly p-compact and unconditionally p-compact) linear operators defined on a Banach predual space of H∞v(U) by linearization. We show that H∞vKp (resp., H∞vKwp and H∞vKup) is a Banach ideal of weighted holomorphic mappings which is generated by composition with the ideal of p-compact (resp., weakly p-compact and unconditionally p-compact) linear operators and contains the Banach ideal of all right p-nuclear weighted holomorphic mappings. We also prove that these weighted holomorphic mappings can be factorized through a quotient space of lp*, and f∈H∞vKp(U,F) (resp., f∈H∞vKup(U,F)) if and only if its transposition ft is quasi p-nuclear (resp., quasi unconditionally p-nuclear).