Equivalent Lagrangians: Multidimensional case

S. Hojman; H. Harleston

doi:10.1063/1.525062

Equivalent Lagrangians: Multidimensional case

S. Hojman, H. Harleston

Facultad de Artes Liberales

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Resumen

We generalize a theorem known for one-dimensional nonsingular equivalent Lagrangians (L and L) to the multidimensional case. In particular, we prove that the matrix Λ, which relates the left-hand sides of the Euler-Lagrange equations obtained from L and L, is such that the trace of all its integer powers are constants of the motion. We construct several multidimensional examples in which the elements of Λ are functions of position, velocity, and time, and prove that in some cases equivalence prevails even if detΛ=0.

Idioma original	Inglés
Páginas (desde-hasta)	1414-1419
Número de páginas	6
Publicación	Journal of Mathematical Physics
Volumen	22
N.º	7
DOI	https://doi.org/10.1063/1.525062
Estado	Publicada - 1980

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abstract = "We generalize a theorem known for one-dimensional nonsingular equivalent Lagrangians (L and L) to the multidimensional case. In particular, we prove that the matrix Λ, which relates the left-hand sides of the Euler-Lagrange equations obtained from L and L, is such that the trace of all its integer powers are constants of the motion. We construct several multidimensional examples in which the elements of Λ are functions of position, velocity, and time, and prove that in some cases equivalence prevails even if detΛ=0.",

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Equivalent Lagrangians: Multidimensional case

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