On holomorphic mappings with relatively $p$-compact range
Abstract
Related to the concept of -compact operator with introduced by Sinha and Karn, this paper deals with the space of all Banach-valued holomorphic mappings on an open subset of a complex Banach space whose ranges are relatively -compact subsets of . We characterize such holomorphic mappings as those whose Mujica's linearisations on the canonical predual of are -compact operators. This fact allows us to make a complete study of them. We show that is a surjective Banach ideal of bounded holomorphic mappings which is generated by composition with the ideal of -compact operators and contains the Banach ideal of all right -nuclear holomorphic mappings. We also characterize holomorphic mappings with relatively -compact ranges as those bounded holomorphic mappings which factorize through a quotient space of or as those whose transposes are quasi -nuclear operators (respectively, factor through a closed subspace of ).
Cite
@article{arxiv.2209.03662,
title = {On holomorphic mappings with relatively $p$-compact range},
author = {A. Jiménez-Vargas},
journal= {arXiv preprint arXiv:2209.03662},
year = {2023}
}
Comments
11 pages