2011
DOI: 10.1088/0031-8949/83/02/025402
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System mixedness as a contributor to entanglement in the Jaynes–Cummings model

Abstract: The effects of a chaotic field on the entanglement dynamics in a system of interaction of a two-level atom with a single-mode cavity field prepared in a Glauber-Lachs state were investigated in the framework of the Jaynes-Cummings model. We found that the entanglement is a non-monotonic function of the ratio of the mean numbers of thermal photons and coherent photons or, equivalently, the degree of initial mixedness of the system. There is an optimal value of this ratio up to which thermal photons contribute i… Show more

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Cited by 8 publications
(13 citation statements)
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“…If λ k are the eigenvalues ofρ P T (t), then N (t) = k [|λ k | − λ k ] /2. In the case of atom-field evolution under Jaynes-Cummings interaction, the time-averaged entanglement depends on the initial mixedness of the bipartite state [14]. The mixedness of the DTS…”
Section: Population Inversion and Entanglement Dynamicsmentioning
confidence: 99%
“…If λ k are the eigenvalues ofρ P T (t), then N (t) = k [|λ k | − λ k ] /2. In the case of atom-field evolution under Jaynes-Cummings interaction, the time-averaged entanglement depends on the initial mixedness of the bipartite state [14]. The mixedness of the DTS…”
Section: Population Inversion and Entanglement Dynamicsmentioning
confidence: 99%
“…One reaches the same condition by finding an upper bound to the concurrence of the state projecting the qudit into the subspace spanned by two consecutive Fock states |n , |n + 1 [17]. Another way to arrive to the constraints given by (19) is by using the bound on the concurrence for a 2 × N dimensional system derived in [50] in which a set of N(N − 1)/2 quantities are proposed to bound the concurrence of the system. Of these only N − 1 turn out to be not trivial and they express the same bounds contained in (19).…”
Section: Entanglement Detectionmentioning
confidence: 99%
“…Another way to arrive to the constraints given by (19) is by using the bound on the concurrence for a 2 × N dimensional system derived in [50] in which a set of N(N − 1)/2 quantities are proposed to bound the concurrence of the system. Of these only N − 1 turn out to be not trivial and they express the same bounds contained in (19). Using the results from [50] the following bound for the concurrence is found:…”
Section: Entanglement Detectionmentioning
confidence: 99%
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