A well-known method of transferring the population of a quantum system from
an eigenspace of the free Hamiltonian to another is to use a periodic control
law with an angular frequency equal to the difference of the eigenvalues. For
finite dimensional quantum systems, the classical theory of averaging provides
a rigorous explanation of this experimentally validated result. This paper
extends this finite dimensional result, known as the Rotating Wave
Approximation, to infinite dimensional systems and provides explicit
convergence estimates.Comment: Available online
  http://www.sciencedirect.com/science/article/pii/S000510981200286

Chambrion, Thomas

English

arXiv

Final version published in Automatica http://www.sciencedirect.com/science/article/pii/S0005109812002865International audienceA well-known method of transferring the population of a quantum system from an eigenspace of the free Hamiltonian to another is to use a periodic control law with an angular frequency equal to the difference of the eigenvalues. For finite dimensional quantum systems, the classical theory of averaging provides a rigorous explanation of this experimentally validated result. This paper extends this finite dimensional result, known as the Rotating Wave Approximation, to infinite dimensional systems and provides explicit convergence estimates

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Periodic excitations of bilinear quantum systems

https://hal.archives-ouvertes.fr/hal-00594895

Periodic excitations of bilinear quantum systems

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