Remarks on Gurarii spaces
Abstract
We present selected known results and some of their improvements, involving Gurarii spaces. A Banach space is Gurarii if it has certain natural extension property for almost isometric embeddings of finite-dimensional spaces. Deleting the word "almost", we get the notion of a strong Gurarii space. There exists a unique (up to isometry) separable Gurarii space, however strong Gurarii spaces cannot be separable. The structure of the class of non-separable Gurarii spaces seems to be not very well understood. We discuss some of their properties and state some open questions. In particular, we characterize non-separable Gurarii spaces in terms of skeletons of separable subspaces, we construct a non-separable Gurarii space with a projectional resolution of the identity and we show that no strong Gurarii space can be weakly Lindel\"of determined.
Cite
@article{arxiv.1111.5840,
title = {Remarks on Gurarii spaces},
author = {Joanna Garbulińska and Wiesław Kubiś},
journal= {arXiv preprint arXiv:1111.5840},
year = {2015}
}
Comments
30 pages