Quantum Wasserstein distance based on an optimization over separable states

Tóth, Géza and Pitrik, József (2023) Quantum Wasserstein distance based on an optimization over separable states. QUANTUM, 7. ISSN 2521-327X

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Abstract

We define the quantum Wasserstein distance such that the optimization of the coupling is carried out over bipartite separable states rather than bipartite quantum states in general, and examine its properties. Sur-prisingly, we find that the self-distance is related to the quantum Fisher information. We present a transport map corresponding to an optimal bipartite separable state. We discuss how the quantum Wasserstein distance introduced is connected to criteria detecting quantum entanglement. We define variance -like quantities that can be obtained from the quantum Wasserstein distance by replacing the minimization over quantum states by a maximization. We extend our results to a family of generalized quantum Fisher infor-mation quantities.

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