A note on differentials of holomorphic functions

Abstract

Recently, in arXiv:2304.07149, a bridge was made between the very active area of spaces of Lipschitz real functions on a metric space and holomorphic functions on an open subset of a Banach space. This was done by introducing and studying the space HL0(BX) of holomorphic Lipschitz functions defined on BX, the open unit ball of the complex Banach space X vanishing at 0. There it was proved that this space is isometrically isomorphic to a subspace of H∞(BX, X*), the space of bounded holomorphic mapping with values in the topological dual of X. In that paper it was shown that this subspace was a proper one, except in the one dimensional case. The goal of this note is to give an intrinsic characterization of the elements of that subspace. Moreover, in the case where X additionally has a Schauder basis, it is shown that there is an explicit way to calculate whether and element of H∞(BX, X*) belongs or not to that subspace.

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