Abstract
Properties of random mixed states of dimension distributed uniformly with respect to the Hilbert-Schmidt measure are investigated. We show that for large , due to the concentration of measure, the trace distance between two random states tends to a fixed number , which yields the Helstrom bound on their distinguishability. To arrive at this result, we apply free random calculus and derive the symmetrized Marchenko-Pastur distribution, which is shown to describe numerical data for the model of coupled quantum kicked tops. Asymptotic value for the root fidelity between two random states, , can serve as a universal reference value for further theoretical and experimental studies. Analogous results for quantum relative entropy and Chernoff quantity provide other bounds on the distinguishablity of both states in a multiple measurement setup due to the quantum Sanov theorem. We study also mean entropy of coherence of random pure and mixed states and entanglement of a generic mixed state of a bipartite system.
- Received 26 July 2015
DOI:https://doi.org/10.1103/PhysRevA.93.062112
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