Linearization of holomorphic Lipschitz functions
Abstract
Let and be complex Banach spaces with denoting the open unit ball of This paper studies various aspects of the {\em holomorphic Lipschitz space} , endowed with the Lipschitz norm. This space is the intersection of the spaces, of Lipschitz mappings and of bounded holomorphic mappings, from to . Thanks to the Dixmier-Ng theorem, is indeed a dual space, whose predual shares linearization properties with both the Lipschitz-free space and Dineen-Mujica predual of . We explore the similarities and differences between these spaces, and combine techniques to study the properties of the space of holomorphic Lipschitz functions. In particular, we get that contains a 1-complemented subspace isometric to and that has the (metric) approximation property whenever has it. We also analyze when is a subspace of , and we obtain an analogous to Godefroy's characterization of functionals with a unique norm preserving extension to the holomorphic Lipschitz context.
Keywords
Cite
@article{arxiv.2304.07149,
title = {Linearization of holomorphic Lipschitz functions},
author = {Richard Aron and Verónica Dimant and Luis C. García-Lirola and Manuel Maestre},
journal= {arXiv preprint arXiv:2304.07149},
year = {2023}
}
Comments
31 pages. Version 2 includes a new result on the approximation property of $\mathcal G_0(B_X)$