English

Perfect quantum protractors

Quantum Physics 2024-09-04 v2

Abstract

In this paper we introduce and investigate the concept of a perfect quantum protractor, a pure quantum state ψH|\psi\rangle\in\mathcal{H} that generates three different orthogonal bases of H\mathcal{H} under rotations around each of the three perpendicular axes. Such states can be understood as pure states of maximal uncertainty with regards to the three components of the angular momentum operator, as we prove that they maximise various entropic and variance-based measures of such uncertainty. We argue that perfect quantum protractors can only exist for systems with a well-defined total angular momentum jj, and we prove that they do not exist for j{1/2,2,5/2}j\in\{1/2,2,5/2\}, but they do exist for j{1,3/2,3}j\in\{1,3/2,3\} (with numerical evidence for their existence when j=7/2j=7/2). We also explain that perfect quantum protractors form an optimal resource for a metrological task of estimating the angle of rotation around (or the strength of magnetic field along) one of the three perpendicular axes, when the axis is not a priori\textit{a priori} known. Finally, we demonstrate this metrological utility by performing an experiment with warm atomic vapours of rubidium-87, where we prepare a perfect quantum protractor for a spin-1 system, let it precess around xx, yy or zz axis, and then employ it to optimally estimate the rotation angle.

Keywords

Cite

@article{arxiv.2310.13045,
  title  = {Perfect quantum protractors},
  author = {Michał Piotrak and Marek Kopciuch and Arash Dezhang Fard and Magdalena Smolis and Szymon Pustelny and Kamil Korzekwa},
  journal= {arXiv preprint arXiv:2310.13045},
  year   = {2024}
}

Comments

20 pages, 7 figures. Published version

R2 v1 2026-06-28T12:56:03.490Z