On strongly norm attaining Lipschitz maps
Abstract
We study the set of those Lipschitz maps from a (complete pointed) metric space to a Banach space which (strongly) attain their Lipschitz norm (i.e.\ the supremum defining the Lipschitz norm is a maximum). Extending previous results, we prove that this set is not norm dense when is a length space (or local) or when is a closed subset of with positive Lebesgue measure, providing new examples which have very different topological properties than the previously known ones. On the other hand, we study the linear properties which are sufficient to get Lindenstrauss property A for the Lipschitz-free space over , and show that all of them actually provide the norm density of in the space of all Lipschitz maps from to any Banach space . Next, we prove that is weakly sequentially dense in the space of all Lipschitz functions for all metric spaces . Finally, we show that the norm of the bidual space of is octahedral provided the metric space is discrete but not uniformly discrete or is infinite.
Cite
@article{arxiv.1807.03363,
title = {On strongly norm attaining Lipschitz maps},
author = {Bernardo Cascales and Rafa Chiclana and Luis Garcia-Lirola and Miguel Martin and Abraham Rueda Zoca},
journal= {arXiv preprint arXiv:1807.03363},
year = {2019}
}
Comments
28 pages, electronically published in the Journal of Functional Analysis