English

Quantifying properties ($K$) and ($\mu^{s}$)

Functional Analysis 2021-02-02 v1

Abstract

A Banach space XX has \textit{property (K)(K)}, whenever every weak* null sequence in the dual space admits a convex block subsequence (fn)n=1(f_{n})_{n=1}^\infty so that fn,xn0\langle f_{n},x_{n}\rangle\to 0 as nn\to \infty for every weakly null sequence (xn)n=1(x_{n})_{n=1}^\infty in XX; XX has \textit{property (μs)(\mu^{s})} if every weak^{*} null sequence in XX^{*} admits a subsequence so that all of its subsequences are Ces\`{a}ro convergent to 00 with respect to the Mackey topology. Both property (μs)(\mu^{s}) and reflexivity (or even the Grothendieck property) imply property (K)(K). In the present paper we propose natural ways for quantifying the aforementioned properties in the spirit of recent results concerning other familiar properties of Banach spaces.

Keywords

Cite

@article{arxiv.2102.00857,
  title  = {Quantifying properties ($K$) and ($\mu^{s}$)},
  author = {Dongyang Chen and Tomasz Kania and Yingbin Ruan},
  journal= {arXiv preprint arXiv:2102.00857},
  year   = {2021}
}

Comments

19 pp

R2 v1 2026-06-23T22:43:28.280Z