Abstract
Taking the Liouville theorem as a guiding principle, we propose a possible generalization of classical Hamiltonian dynamics to a three-dimensional phase space. The equation of motion involves two Hamiltonians and three canonical variables. The fact that the Euler equations for a rotator can be cast into this form suggests the potential usefulness of the formalism. In this article we study its general properties and the problem of quantization.
- Received 26 December 1972
DOI:https://doi.org/10.1103/PhysRevD.7.2405
©1973 American Physical Society
Comments & Replies
Remarks concerning Nambu's generalized mechanics
F. Bayen and M. Flato
Phys. Rev. D 11, 3049 (1975)
Comments on Generalized Hamiltonian Dynamics
Frank B. Estabrook
Phys. Rev. D 8, 2740 (1973)
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