Linear maps preserving $\ell_p$-norm parallel vectors
Abstract
Two vectors in a normed vector space are parallel if there is a scalar with such that ; they form a triangle equality attaining (TEA) pair if . In this paper, we characterize linear maps on or , equipped with the -norm for , preserving parallel pairs or preserving TEA pairs. Indeed, any linear map will preserve parallel pairs and TEA pairs when . For the -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 -norm, a nonzero TEA preserver, or a parallel preserver of rank greater than one, is always a multiple of an -norm isometry, except when . We also have a characterization for the exceptional case. The results are extended to linear maps of the infinite dimensional spaces , and .
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}
}