Stepwise introduction of model complexity in a generalized master equation approach to time-dependent transport. Gudmundsson, V., Jonasson, O., Arnold, T., Tang, C., Goan, H., & Manolescu, A. Fortschritte der Physik, 61(2-3):305--316, WILEY-VCH Verlag, 2013.
Stepwise introduction of model complexity in a generalized master equation approach to time-dependent transport [link]Paper  doi  abstract   bibtex   
We demonstrate that with a stepwise introduction of complexity to a model of an electron system embedded in a photonic cavity and a carefully controlled stepwise truncation of the ensuing many-body space it is possible to describe the time-dependent transport of electrons through the system with a non-Markovian generalized quantum master equation. We show how this approach retains effects of the geometry of an anisotropic electronic system. The Coulomb interaction between the electrons and the full electromagnetic coupling between the electrons and the photons are treated in a non-perturbative way using exact numerical diagonalization.
@article {PROP:PROP201200053,
author = {Gudmundsson, V. and Jonasson, O. and Arnold, Th. and Tang, C-S. and Goan, H.-S. and Manolescu, A.},
title = {Stepwise introduction of model complexity in a generalized master equation approach to time-dependent transport},
journal = {Fortschritte der Physik},
volume = {61},
number = {2-3},
publisher = {WILEY-VCH Verlag},
issn = {1521-3978},
url = {http://dx.doi.org/10.1002/prop.201200053},
doi = {10.1002/prop.201200053},
pages = {305--316},
keywords = {Open system, Coulomb interaction, photon cavity, time-dependent transport.},
year = {2013},
abstract={We demonstrate that with a stepwise introduction of complexity to a model of an electron system embedded in a photonic cavity and a carefully controlled stepwise truncation of the ensuing many-body space it is possible to describe the time-dependent transport of electrons through the system with a non-Markovian generalized quantum master equation. We show how this approach retains effects of the geometry of an anisotropic electronic system. The Coulomb interaction between the electrons and the full electromagnetic coupling between the electrons and the photons are treated in a non-perturbative way using exact numerical diagonalization.},
arxiv = "http://arxiv.org/abs/1203.3048"
}

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