English

Approximately bisectrix-orthogonality preserving mappings

Functional Analysis 2015-06-23 v1

Abstract

Regarding the geometry of a real normed space X{\mathcal X}, we mainly introduce a notion of approximate bisectrix-orthogonality on vectors x,yXx, y \in {\mathcal X} as follows: x\npεWy\mboxifandonlyif21ε1+εxyyx+xy21+ε1εxy.{x\np{\varepsilon}}_W y \mbox{if and only if} \sqrt{2}\frac{1-\varepsilon}{1+\varepsilon}\|x\|\,\|y\|\leq \Big\|\,\|y\|x+\|x\|y\,\Big\|\leq\sqrt{2}\frac{1+\varepsilon}{1-\varepsilon}\|x\|\,\|y\|. We study class of linear mappings preserving the approximately bisectrix-orthogonality \npεW{\np{\varepsilon}}_W. In particular, we show that if T:XYT: {\mathcal X}\to {\mathcal Y} is an approximate linear similarity, then x\npδWyTx\npθWTy(x,yX){x\np{\delta}}_W y\Longrightarrow {Tx \np{\theta}}_W Ty \qquad (x, y\in {\mathcal X}) for any δ[0,1)\delta\in[0, 1) and certain θ0\theta\geq 0.

Keywords

Cite

@article{arxiv.1506.06218,
  title  = {Approximately bisectrix-orthogonality preserving mappings},
  author = {Ali Zamani},
  journal= {arXiv preprint arXiv:1506.06218},
  year   = {2015}
}
R2 v1 2026-06-22T09:57:10.597Z