Title :
Perturbation theory and control in classical or quantum mechanics by a closed formula
Author_Institution :
Centre de Phys. Theor., CNRS, Marseille, France
Abstract :
We consider a perturbation of an "integrable" Hamiltonian and give an expression for the canonical or unitary transformation which "simplifies" this perturbed system. The problem is to invert a functional defined on the Lie-algebra of observables. We give a bound for the perturbation in order to solve this inversion. And apply this result to a particular case of the control theory, as a first example, and to the "quantum adiabatic transformation", as another example.
Keywords :
Lie algebras; classical mechanics; control theory; integral equations; perturbation theory; quantum theory; Lie-algebra; canonical transformation; classical mechanics; control theory; integrable Hamiltonian; perturbation theory; quantum adiabatic transformation; quantum mechanics; unitary transformation; Algebra; Control systems; Control theory; Hilbert space; Jacobian matrices; Planets; Power generation; Quantum mechanics;
Conference_Titel :
Physics and Control, 2005. Proceedings. 2005 International Conference
Print_ISBN :
0-7803-9235-3
DOI :
10.1109/PHYCON.2005.1514060
