Monotone path-connectedness of Chebyshev sets in three-dimensional spaces-Reference-Cited by-同舟云学术

Monotone path-connectedness of Chebyshev sets in three-dimensional spaces

Published:2021-05-01 Issue:5 Volume:212 Page:636-654
ISSN:1064-5616
Container-title:Sbornik: Mathematics
language:
Short-container-title:Sb. Math.

Author:

Alimov A. R.,Bednov B. B.

Abstract

Abstract We characterize the three-dimensional Banach spaces in which any Chebyshev set is monotone path-connected. Namely, we show that in a three-dimensional space

each Chebyshev set is monotone path- connected if and only if one of the following two conditions is satisfied: any exposed point of the unit sphere of

is a smooth point or

(that is, the unit sphere of

is a cylinder). Bibliography: 17 titles.

Funder

Russian Foundation for Basic Research

Publisher

IOP Publishing

Subject

Algebra and Number Theory

Link

https://iopscience.iop.org/article/10.1070/SM9325/pdf

Cited by 8 articles. 订阅此论文施引文献订阅此论文施引文献，注册后可以免费订阅5篇论文的施引文献，订阅后可以查看论文全部施引文献

1. Monotone path-connected sets in geometric approximation theory and their applications;Mathematics and Theoretical Computer Science;2024-07-28

2. Three-Dimensional Spaces Where All Bounded Chebyshev Sets Are Monotone Path Connected;Mathematical Notes;2023-10

3. On local properties of spaces implying monotone path-connectedness of suns;The Journal of Analysis;2023-03-11

4. Solarity and Proximinality in Generalized Rational Approximation in Spaces $$C(Q)$$ and $$L^p$$;Russian Journal of Mathematical Physics;2022-09

5. Suns, Moons, and $$\mathring{B}$$-complete Sets in Asymmetric Spaces;Set-Valued and Variational Analysis;2022-05-26