Trees in renorming theory
Abstract
Trees are very agreeable objects to work with, offering a diversity of behaviour within a structure that is sufficiently simple to admit precise analysis. Thus we are able to offer fairly satisfactory necessary and sufficient conditions on a tree for the existence of equivalent LUR or strictly convex norms on and for norms with the Kadec Property. In particular, we show that for a {\sl finitely branching} tree the space admits a Kadec renorming. Since some finitely branching trees fail the condition for strictly convex renormability, we obtain an example of a Banach space that is Kadec renormable but not strictly convexifiable. Consideration of specially tailored examples enables us to answer the ``three-space problem'' for strictly convex renorming: there exists a Banach space with a closed subspace such that both and the quotient admit strictly convex norms, while does not. We also solve a problem about the property of mid-point locally uniform convexity (MLUR), showing that this does not imply LUR renormability.
Cite
@article{arxiv.math/9509217,
title = {Trees in renorming theory},
author = {Richard Haydon},
journal= {arXiv preprint arXiv:math/9509217},
year = {2016}
}