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Distribution and quantification of remotely generated Wigner negativity

X. D. Yu, Shuheng Liu, Jiajie Guo, Qihuang Gong, Nicolas Treps, Qiongyi He, Mattia Walschaers

2022npj Quantum Information18 citationsDOIOpen Access PDF

Abstract

Abstract Wigner negativity, as a well-known indicator of nonclassicality, plays an essential role in quantum computing and simulation using continuous-variable systems. The conditional preparation of Wigner-negative states through appropriate non-Gaussian operations on an auxiliary mode is common procedure in quantum optics experiments. Motivated by the demand of real-world quantum network, here we investigate the remote creation and distribution of Wigner negativity in the multipartite scenario from a quantitative perspective. By establishing a monogamy relation akin to the generalized Coffman-Kundu-Wootters inequality, we show that the amount of Wigner negativity cannot be freely distributed among different modes. Moreover, for photon subtraction—one of the main experimentally realized non-Gaussian operations—we provide an intuitive method to quantify remotely generated Wigner negativity. Our results pave the way for exploiting Wigner negativity as a valuable resource for numerous quantum information protocols based on non-Gaussian scenario.

Topics & Concepts

Wigner distribution functionComputer scienceGaussianStatistical physicsNegativity effectMultipartiteQuantumAlgorithmTheoretical computer scienceQuantum mechanicsQuantum entanglementPhysicsPsychologySocial psychologyQuantum Information and CryptographyQuantum Mechanics and ApplicationsQuantum optics and atomic interactions