Abstract
AbstractThe 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.
Publisher
Cambridge University Press (CUP)
Reference9 articles.
1. Conservation Laws for Gauge-Variant Lagrangians in Classical Mechanics
2. The complete symmetry group of the one‐dimensional time‐dependent harmonic oscillator
3. Symmetries of the time-dependent N-dimensional oscillator
4. [6] Prince G. E. and Eliezer C. J. , “On the Lie symmetries of the classical Kepler problem”, Research Report AM79:06 (Department of Applied Mathematics, La Trobe University).
5. A contribution to the generalized Noether's theorem;Djukic;Arch. Mech. Stos.,1974
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