English

A Note on the Chebyshev Set Problem in Normed Linear Spaces

Functional Analysis 2023-02-07 v1

Abstract

Best approximation (BA) is an interesting field in functional analysis that has attracted a lot of attention from many researchers for a very long period of time up-to-date. Of greatest consideration is the characterization of the Chebyshev set (CS) which is a subset of a normed linear space (NLS) which contains unique BAs. However, a fundamental question remains unsolved to-date regarding the convexity of the CS in infinite NLS known as the CS problem. The question which has not been answered is: Is every CS in a NLS convex?. This question has not got any solution including the simplest form of a real Hilbert space (HS). In this note, we characterize CSs and convexity in NLSs. In particular, we consider the space of all real-valued norm-attainable functions. We show that CSs of the space of all real-valued norm-attainable functions are convex when they are closed, rotund and admits both Gateaux and Fr\'{e}chet differentiability conditions.

Keywords

Cite

@article{arxiv.2302.03000,
  title  = {A Note on the Chebyshev Set Problem in Normed Linear Spaces},
  author = {Samson Owiti and Benard Okelo and Julia Owino},
  journal= {arXiv preprint arXiv:2302.03000},
  year   = {2023}
}

Comments

7 pages

R2 v1 2026-06-28T08:33:20.936Z