English

Commutators close to the identity

Operator Algebras 2018-09-21 v3

Abstract

Let D,XB(H)D,X \in B(H) be bounded operators on an infinite dimensional Hilbert space HH. If the commutator [D,X]=DXXD[D,X] = DX-XD lies within ε\varepsilon in operator norm of the identity operator 1B(H)1_{B(H)}, then it was observed by Popa that one has the lower bound DX12log1ε\| D \| \|X\| \geq \frac{1}{2} \log \frac{1}{\varepsilon} on the product of the operator norms of D,XD,X; this is a quantitative version of the Wintner-Wielandt theorem that 1B(H)1_{B(H)} cannot be expressed as the commutator of bounded operators. On the other hand, it follows easily from the work of Brown and Pearcy that one can construct examples in which DX=O(ε2)\|D\| \|X\| = O(\varepsilon^{-2}). In this note, we improve the Brown-Pearcy construction to obtain examples of D,XD,X with [D,X]1B(H)ε\| [D,X] - 1_{B(H)} \| \leq \varepsilon and DX=O(log51ε)\| D\| \|X\| = O( \log^{5} \frac{1}{\varepsilon} ).

Keywords

Cite

@article{arxiv.1805.11131,
  title  = {Commutators close to the identity},
  author = {Terence Tao},
  journal= {arXiv preprint arXiv:1805.11131},
  year   = {2018}
}

Comments

15 pages, no figures. To appear, J. Op. Thy. This is the final version, incorporating the referee comments (in particular improving the exponent of 16 to 5)

R2 v1 2026-06-23T02:11:03.746Z