Robustness of non-Gaussian entanglement against noisy amplifier and attenuator environments
arXiv:1103.1311 · doi:10.1103/PhysRevLett.107.130501
Abstract
The recently developed Kraus representation for bosonic Gaussian channels is employed to study analytically the robustness of non-Gaussian entanglement against evolution under noisy attenuator and amplifier environments, and compare it with the robustness of Gaussian entanglement. Our results show that some non-Gaussian states with one ebit of entanglement are more robust than all Gaussian states, even the ones with arbitrarily large entanglement, a conclusion of direct consequence to the recent conjecture by Allegra et al. [PRL, 105, 100503 (2010)].
4 pages, 4 figures