English

Approximate numerical radius orthogonality

Functional Analysis 2020-10-12 v1

Abstract

We introduce the notion of approximate numerical radius (Birkhoff) orthogonality and investigate its significant properties. Let T,SB(H)T, S\in \mathbb{B}(\mathscr{H}) and ε[0,1)\varepsilon \in [0, 1). We say that TT is approximate numerical radius orthogonal to SS and we write TωεST\perp^{\varepsilon}_{\omega} S if ω2(T+λS)ω2(T)2εω(T)ω(λS)for all λC.\omega^2(T+\lambda S)\geq \omega^2(T)-2\varepsilon \omega(T) \omega(\lambda S)\,\,\, \text{for all }\lambda\in\mathbb{C}. We show that TωεST\perp^{\varepsilon}_{\omega} S if and only if infθ[0,2π)Dωθ(T,S)εω(T)ω(S)\displaystyle\inf_{\theta\in [0, 2\pi)} D^{\theta}_{\omega}(T, S) \geq -\varepsilon \omega(T) \omega(S) in which Dωθ(T,S)=limr0+ω2(T+reiθS)ω2(T)2rD^{\theta}_{\omega}(T, S)=\displaystyle\lim_{r\to 0^+} \frac{\omega^2(T+re^{i\theta} S)-\omega^2(T)}{2r}; and this occurs if and only if for every θ[0,2π)\theta\in[0,2\pi), there exists a sequence {xnθ}\{x_n^{\theta}\} of unit vectors in H\mathscr{H} such that limnTxnθ,xnθ=ω(T),andlimnRe{eiθTxnθ,xnθSxnθ,xnθˉ}εω(T)ω(S),\displaystyle\lim_{n\to \infty} |\langle Tx^{\theta}_n, x^{\theta}_n\rangle|=\omega(T),\,\, \text{and}\,\, \displaystyle\lim_{n\to \infty} {\rm Re}\{e^{-i\theta} \langle Tx^{\theta}_n, x^{\theta}_n\rangle\bar{\langle Sx^{\theta}_n, x^{\theta}_n\rangle}\}\geq -\varepsilon \omega(T) \omega(S), where ω(T)\omega(T) is the numerical radius of TT.

Cite

@article{arxiv.2010.04619,
  title  = {Approximate numerical radius orthogonality},
  author = {Maryam Amyari and Marzieh Moradian Khibary},
  journal= {arXiv preprint arXiv:2010.04619},
  year   = {2020}
}

Comments

14 pages

R2 v1 2026-06-23T19:12:42.906Z