English

Linear maps preserving $\ell_p$-norm parallel vectors

Functional Analysis 2024-07-30 v1 Rings and Algebras

Abstract

Two vectors x,yx, y in a normed vector space are parallel if there is a scalar μ\mu with μ=1|\mu| = 1 such that x+μy=x+y\|x+\mu y\| = \|x\| + \|y\|; they form a triangle equality attaining (TEA) pair if x+y=x+y\|x+y\| = \|x\| + \|y\|. In this paper, we characterize linear maps on Fn=RnF^n=R^n or CnC^n, equipped with the p\ell_p-norm for p[1,]p \in [1, \infty], preserving parallel pairs or preserving TEA pairs. Indeed, any linear map will preserve parallel pairs and TEA pairs when 1<p<1< p <\infty. For the 1\ell_1-norm, TEA preservers form a semigroup of matrices in which each row has at most one nonzero entries; adding rank one matrices to this semigroup will be the semigroup of parallel preserves. For the \ell_\infty-norm, a nonzero TEA preserver, or a parallel preserver of rank greater than one, is always a multiple of an \ell_\infty-norm isometry, except when Fn=R2F^n = R^2. We also have a characterization for the exceptional case. The results are extended to linear maps of the infinite dimensional spaces 1(Λ)\ell_1(\Lambda), c0(Λ)c_0(\Lambda) and (Λ)\ell_\infty(\Lambda).

Keywords

Cite

@article{arxiv.2407.19276,
  title  = {Linear maps preserving $\ell_p$-norm parallel vectors},
  author = {Chi-Kwong Li and Ming-Cheng Tsai and Ya-Shu Wang and Ngai-Ching Wong},
  journal= {arXiv preprint arXiv:2407.19276},
  year   = {2024}
}
R2 v1 2026-06-28T17:55:32.792Z