Rank penalized estimation of a quantum system

Abstract

We introduce a new method to reconstruct the density matrix of a system of n-qubits and estimate its rank d from data obtained by quantum state tomography measurements repeated m times. The procedure consists in minimizing the risk of a linear estimator of penalized by given rank (from 1 to 2n), where is previously obtained by the moment method. We obtain simultaneously an estimator of the rank and the resulting density matrix associated to this rank. We establish an upper bound for the error of penalized estimator, evaluated with the Frobenius norm, which is of order dn(4/3)n /m and consistency for the estimator of the rank. The proposed methodology is computationaly efficient and is illustrated with some example states and real experimental data sets.