Separable elastic Banach spaces are universal
Functional Analysis
2015-02-13 v1
Abstract
A Banach space is elastic if there is a constant so that whenever a Banach space embeds into , then there is an embedding of into with constant . We prove that embeds into separable infinite dimensional elastic Banach spaces, and therefore they are universal for all separable Banach spaces. This confirms a conjecture of Johnson and Odell. The proof uses incremental embeddings into of spaces for countable compact of increasing complexity. To achieve this we develop a generalization of Bourgain's basis index that applies to unconditional sums of Banach spaces and prove a strengthening of the weak injectivity property of these that is realized on special reproducible bases.
Cite
@article{arxiv.1502.03791,
title = {Separable elastic Banach spaces are universal},
author = {Dale E. Alspach and Bunyamin Sari},
journal= {arXiv preprint arXiv:1502.03791},
year = {2015}
}
Comments
27 pages