Abstract
Open Quantum Random Walks, as developed in Attal et al. (J. Stat. Phys. 147(4):832–852, 2012), are a quantum generalization of Markov chains on finite graphs or on lattices. These random walks are typically quantum in their behavior, step by step, but they seem to show up a rather classical asymptotic behavior, as opposed to the quantum random walks usually considered in quantum information theory (such as the well-known Hadamard random walk). Typically, in the case of open quantum random walks on lattices, their distribution seems to always converge to a Gaussian distribution or a mixture of Gaussian distributions. In the case of nearest neighbors homogeneous open quantum random walks on \({\mathbb{Z}^{\rm d},}\) we prove such a central limit theorem, in the case where only one Gaussian distribution appears in the limit. Through the quantum trajectory point of view on quantum master equations, we transform the problem into studying a certain functional of a Markov chain on \({\mathbb{Z}^{\rm d}}\) times the Banach space of quantum states. The main difficulty is that we know nothing about the invariant measures of this Markov chain, even their existence. Surprisingly enough, we are able to produce a central limit theorem with explicit drift and explicit covariance matrix. The interesting point which appears with our construction and result is that it applies actually to a wider setup: it provides a central limit theorem for the sequence of recordings of the quantum trajectories associated wih any completely positive map. This is what we show and develop as an application of our result. In a second step we are able to extend our Central Limit Theorem to the case of several asymptotic Gaussians, in the case where the operator coefficients of the quantum walk are block diagonal in a common basis.
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Communicated by Denis Bernard.
The work was supported by ANR project “HAM-MARK”, N° ANR-09-BLAN-0098-01.
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Attal, S., Guillotin-Plantard, N. & Sabot, C. Central Limit Theorems for Open Quantum Random Walks and Quantum Measurement Records. Ann. Henri Poincaré 16, 15–43 (2015). https://doi.org/10.1007/s00023-014-0319-3
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DOI: https://doi.org/10.1007/s00023-014-0319-3