English

On mapping theorems for numerical range

Functional Analysis 2015-10-29 v1

Abstract

Let TT be an operator on a Hilbert space HH with numerical radius w(T)1w(T)\le1. According to a theorem of Berger and Stampfli, if ff is a function in the disk algebra such that f(0)=0f(0)=0, then w(f(T))fw(f(T))\le\|f\|_\infty. We give a new and elementary proof of this result using finite Blaschke products. A well-known result relating numerical radius and norm says T2w(T)\|T\| \leq 2w(T). We obtain a local improvement of this estimate, namely, if w(T)1w(T)\le1 then Tx22+21Tx,x2(xH, x1). \|Tx\|^2\le 2+2\sqrt{1-|\langle Tx,x\rangle|^2} \qquad(x\in H,~\|x\|\le1). Using this refinement, we give a simplified proof of Drury's teardrop theorem, which extends the Berger-Stampfli theorem to the case f(0)0f(0)\ne0.

Keywords

Cite

@article{arxiv.1510.08132,
  title  = {On mapping theorems for numerical range},
  author = {Hubert Klaja and Javad Mashreghi and Thomas Ransford},
  journal= {arXiv preprint arXiv:1510.08132},
  year   = {2015}
}
R2 v1 2026-06-22T11:30:37.112Z