%0 Journal Article
%T Singular perturbations and Lindblad-Kossakowski differential equations
%+ Centre Automatique et Systèmes (CAS)
%+ SIgnals and SYstems in PHysiology & Engineering (SISYPHE)
%A Rouchon, Pierre
%A Mirrahimi, Mazyar
%< avec comité de lecture
%@ 0018-9286
%J IEEE Transactions on Automatic Control
%I Institute of Electrical and Electronics Engineers
%V 54
%N 6
%P 1325 - 1329
%8 2009
%D 2009
%R 10.1109/TAC.2009.2015542
%K Adiabatic approximation
%K coherent population trapping
%K Lindblad–Kossakowski master equation
%K model reduction
%K open quantum systems
%K optical pumping
%K singular perturbations
%Z Engineering Sciences [physics]/AutomaticJournal articles
%X We consider an ensemble of quantum systems whose average evolution is described by a density matrix, solution of a Lindblad-Kossakowski differential equation. We focus on the special case where the decoherence is only due to a highly unstable excited state and where the spontaneously emitted photons are measured by a photo-detector. We propose a systematic method to eliminate the fast and asymptotically stable dynamics associated to the excited state in order to obtain another differential equation for the slow part. We show that this slow differential equation is still of Lindblad-Kossakowski type, that the decoherence terms and the measured output depend explicitly on the amplitudes of quasi-resonant applied field, i.e., the control. Beside a rigorous proof of the slow/fast (adiabatic) reduction based on singular perturbation theory, we also provide a physical interpretation of the result in the context of coherence population trapping via dark states and decoherence-free subspaces. Numerical simulations illustrate the accuracy of the proposed approximation for a 5-level systems.
%G English
%L hal-00447790
%U https://hal-mines-paristech.archives-ouvertes.fr/hal-00447790
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