Fast state tomography with optimal error bounds
Abstract
Projected least squares (PLS) is an intuitive and numerically cheap technique for quantum state tomography. The method first computes the least-squares estimator (or a linear inversion estimator) and then projects the initial estimate onto the space of states. The main result of this paper equips this point estimator with a rigorous, non-asymptotic confidence region expressed in terms of the trace distance. The analysis holds for a variety of measurements, including 2-designs and Pauli measurements. The sample complexity of the estimator is comparable to the strongest convergence guarantees available in the literature and -- in the case of measuring the uniform POVM -- saturates fundamental lower bounds.The results are derived by reinterpreting the least-squares estimator as a sum of random matrices and applying a matrix-valued concentration inequality. The theory is supported by numerical simulations for mutually unbiased bases, Pauli observables, and Pauli basis measurements.
Cite
@article{arxiv.1809.11162,
title = {Fast state tomography with optimal error bounds},
author = {Madalin Guta and Jonas Kahn and Richard Kueng and Joel A. Tropp},
journal= {arXiv preprint arXiv:1809.11162},
year = {2023}
}
Comments
5+10 pages, 2+1 figures