English

Commutativity from a single Bargmann invariant equality

Quantum Physics 2026-05-11 v1

Abstract

Noncommutativity of states and observables is a fundamental signature of quantum theory, and a minimal requirement for nonclassicality. We provide a universal necessary and sufficient condition for pairwise commutativity of quantum states ρ1\rho_1 and ρ2\rho_2: they commute if and only if tr(ρ12ρ22)=tr(ρ1ρ2ρ1ρ2)\mathrm{tr}(\rho_1^2\rho_2^2) = \mathrm{tr}(\rho_1 \rho_2 \rho_1 \rho_2). For qubits the identity simplifies to an equality between polynomials of purities and of the two-state overlap tr(ρ1ρ2)\mathrm{tr}(\rho_1\rho_2). These multivariate traces (known as Bargmann invariants) are directly measurable, allowing commutativity tests that bypass full state tomography. We point out possible applications to the analysis of POVM simulability and partial photonic distinguishability.

Keywords

Cite

@article{arxiv.2605.07405,
  title  = {Commutativity from a single Bargmann invariant equality},
  author = {Rafael Wagner and Ernesto F. Galvão},
  journal= {arXiv preprint arXiv:2605.07405},
  year   = {2026}
}

Comments

5+4 pages, no figures. Comments are welcome!

R2 v1 2026-07-01T12:57:10.839Z