Small oscillations and the Heisenberg Lie algebra
Abstract
The Adler Kostant Symes [A-K-S] scheme is used to describe mechanical systems for quadratic Hamiltonians of R2n on coadjoint orbits of the Heisenberg Lie group. The coadjoint orbits are realized in a solvable Lie algebra g that admits an ad-invariant metric. Its quadratic induces the Hamiltonian on the orbits, whose Hamiltonian system is equivalent to that one on R2n. This system is a Lax pair equation whose solution can be computed with help of the Adjoint representation. For a certain class of functions, the Poisson commutativity on the coadjoint orbits in g is related to the commutativity of a family of derivations of the 2n+1-dimensional Heisenberg Lie algebra hn. Therefore the complete integrability is related to the existence of an n-dimensional abelian subalgebra of certain derivations in hn. For instance, the motion of n-uncoupled harmonic oscillators near an equilibrium position can be described with this setting.
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