Applications of the Lie theory of extended groups in Hamiltonian mechanics: the oscillator and the Kepler problem

P. G. L. Leach

doi:10.1017/S0334270000000151

Abstract

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The method of the Lie theory of extended groups has recently been formulated for Hamiltonian mechanics in a manner which is consistent with the results obtained using the Newtonian equation of motion. Here the method is applied to the three-dimensional time-independent harmonic oscillator and to the classical Kepler problem. The expected constants of motion are obtained. Previously unobserved relations between generators and invariants are also noticed.

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Applications of the Lie theory of extended groups in Hamiltonian mechanics: the oscillator and the Kepler problem

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