Geometric phase in dephasing systems

Wang, L. C.; Wang, Wei

doi:10.1103/physreva.71.044101

Cited by 32 publications

(29 citation statements)

References 29 publications

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“…for the ground state | − 1 ). This finding corroborates the results for the phase in the exactly solvable model of pure dephasing with arbitrary (not only weak) coupling [49][50][51][52]. For the presentation as in Fig.…”

Section: Analysis Of Geometric Phasesupporting

confidence: 90%

Geometric phase as a determinant of a qubit– environment coupling

Dajka

Łuczka

Hänggi

2010

Quantum Inf Process

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We investigate the qubit geometric phase and its properties in dependence on the mechanism for decoherence of a qubit weakly coupled to its environment. We consider two sources of decoherence: dephasing coupling (without exchange of energy with environment) and dissipative coupling (with exchange of energy). Reduced dynamics of the qubit is studied in terms of the rigorous Davies Markovian quantum master equation, both at zero and non-zero temperature. For pure dephasing coupling, the geometric phase varies monotonically with respect to the polar angle (in the Bloch sphere representation) parameterizing an initial state of the qubit. Moreover, it is antisymmetric about some points on the geometric phase-polar angle plane. This is in distinct contrast to the case of dissipative coupling for which the variation of the geometric phase with respect to the polar angle typically is non-monotonic, displaying local extrema and is not antisymmetric. Sensitivity of the geometric phase to details of the decoherence source can make it a tool for testing the nature of the qubit-environment interaction.

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Section: Analysis Of Geometric Phasesupporting

confidence: 90%

Geometric phase as a determinant of a qubit– environment coupling

Dajka

Łuczka

Hänggi

2010

Quantum Inf Process

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“…Later it is proved to be merely a result of RWA and disappears in Rabi model [27], where RWA is not performed. JC model and Rabi model all suppose that the electromagnetic field inside the cavity is monochromatic (single mode), while in reality the imperfection of cavity mirrors will broaden the spectral line, which serves as a bosonic environment (bath), and there are already some works on how geometric phase is affected by dephasing and dissipative environment [28,29].…”

Section: Introductionmentioning

confidence: 99%

Non-Markovian dynamics of the mixed-state geometric phase of dissipative qubits

Guo

Yin

et al. 2014

Phys. Rev. A

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We investigate the geometric phase of a two-level atom (qubit) coupled to a bosonic reservoir with Lorentzian spectral density and find that for the non-Markovian dynamics in which the rotating-wave approximation (RWA) is performed, the geometric phase has a π -phase jump at the nodal point. However, the exact result without the RWA given by the hierarchical equations of motion method shows that there is no such phase jump or nodal structure in the geometric phase. Thus our results demonstrate that the counterrotating terms significantly contribute to the geometric phase in the multimode Hamiltonian under certain circumstances.

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“…In this paper we make use of the method of Tong et al [10] to study the GP of a qubit (a two-level quantum system) interacting with different kinds of system-bath (environment) interactions, one in which there is no energy exchange between the system and its environment, i.e., a quantum non-demolition (QND) interaction and one in which dissipation takes place [24,25]. Throughout, we assume the bath to start in a squeezed thermal initial state, i.e., we deal with a squeezed thermal bath.…”

Section: Introductionmentioning

confidence: 99%

Geometric phase of a qubit interacting with a squeezed-thermal bath

Banerjee

Srikanth

2007

Eur. Phys. J. D

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Abstract. We study the geometric phase of an open two-level quantum system under the influence of a squeezed, thermal environment for both non-dissipative as well as dissipative system-environment interactions. In the non-dissipative case, squeezing is found to have a similar influence as temperature, of suppressing geometric phase, while in the dissipative case, squeezing tends to counteract the suppressive influence of temperature in certain regimes. Thus, an interesting feature that emerges from our work is the contrast in the interplay between squeezing and thermal effects in non-dissipative and dissipative interactions. This can be useful for the practical implementation of geometric quantum information processing.By interpreting the open quantum effects as noisy channels, we make the connection between geometric phase and quantum noise processes familiar from quantum information theory.

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Geometric phase in dephasing systems

Cited by 32 publications

References 29 publications

Geometric phase as a determinant of a qubit– environment coupling

Geometric phase as a determinant of a qubit– environment coupling

Non-Markovian dynamics of the mixed-state geometric phase of dissipative qubits

Geometric phase of a qubit interacting with a squeezed-thermal bath

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