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Group Of Point Transformations Of Time Dependent Harmonic Oscillators, Jose Ricardo Bernal
Group Of Point Transformations Of Time Dependent Harmonic Oscillators, Jose Ricardo Bernal
University of the Pacific Theses and Dissertations
In general, a physical system has invariant quantities which are very often related to its symmetry and to the invariance of the equation that describe it. A detailed study of the invariance property of the differential equation will be helpful in understanding this relation.
The work is concerned with a preliminary investigation of the Lie-group which leaves invariant the Newtonian and Lagrangian equation of motion for a one-dimensional harmonic oscillator. A brief review of Ehrenfest's adiabatic principle and the later treatments on exact and adiabatic invariants will be presented.
Some Applications Of Lie Transformation Groups To Classical Hamiltonian Dynamics, Donald Robert Peterson
Some Applications Of Lie Transformation Groups To Classical Hamiltonian Dynamics, Donald Robert Peterson
University of the Pacific Theses and Dissertations
Recent work has established that a group theoretical viewpoint of completely integrable dynamical systems with N degrees of freedom yields an algorithm that provides new information concerning the symmetry transformation group structure of this class of dynamical systems. The work presented here rests heavily on the results presented in reference and it is recommended that the reader consult this reference for a more rigorous discussion of the results given in this thesis.