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Optimal large-scale quantum state tomography with Pauli measurements

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arxiv 1603.07559 v1 pith:P5UK7FB6 submitted 2016-03-24 math.ST stat.TH

Optimal large-scale quantum state tomography with Pauli measurements

classification math.ST stat.TH
keywords quantumdensitystateestimationmatrixmeasurementsoptimalpauli
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Quantum state tomography aims to determine the state of a quantum system as represented by a density matrix. It is a fundamental task in modern scientific studies involving quantum systems. In this paper, we study estimation of high-dimensional density matrices based on Pauli measurements. In particular, under appropriate notion of sparsity, we establish the minimax optimal rates of convergence for estimation of the density matrix under both the spectral and Frobenius norm losses; and show how these rates can be achieved by a common thresholding approach. Numerical performance of the proposed estimator is also investigated.

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  1. On estimating operator norm distance, with optimal trace distance estimation when one state is pure

    quant-ph 2026-07 accept novelty 7.0

    Rank-independent quantum estimators achieve Θ(1/ε) queries for operator-norm (and trace) distance when one state is pure, and Õ(1/ε^{3/2}) queries for general states, proving BQP-completeness.