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On symmetries and conserved quantities in Nambu mechanics

Published 2013-06-25Version 1

In Hamiltonian mechanics, a (continuous) symmetry leads to conserved quantity, which is a function on (extended) phase space. In Nambu mechanics, a straightforward consequence of symmetry is just a relative integral invariant, a differential form which only upon integration over a cycle provides a conserved real number. The origin of the difference may be traced back to a shift in degrees of relevant forms present in equations of motion, or, alternatively, to a corresponding shift in degrees of relevant objects in action integral for Nambu mechanics.

Journal: J. Math. Phys. 54, 102901 (2013);

DOI: 10.1063/1.4824684

Categories: math-ph, math.DG, math.DS, math.MP

Subjects: 45.20.Jj

Keywords: nambu mechanics, conserved quantity, relevant objects, hamiltonian mechanics, relevant forms

Tags: journal article

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On symmetries and conserved quantities in Nambu mechanics

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On symmetries and conserved quantities in Nambu mechanics

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