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 Dynamics in $D\geq 2$-order Phase Space in the Basis of Multicomplex Algebra
2009jbs | R.M. Yamaleev // Universidad Nacional Autonoma de Mexico, Mexico, Joint Institute for Nuclear Research, Dubna, Russia, iamaleev@servidor.unam.mx
We use commutative {\it algebra of multicomplex numbers}, to construct oscillator model for Hamilton-Nambu
dynamics. We propose a new dynamical principle from which it follows two kind of Hamilton-Nambu equations in $D\geq
2$-dimensional phase space. The first one is formulated with $(D-1)$-evolution parameter and a single Hamiltonian. The
Hamiltonian of the oscillator model in a such dynamics is given by $D$-degree homogeneous form. In the second
formulation, vice versa, the evolution of the system along a single evolution parameter is generated by $(D-1)$
Hamiltonian. The latter is given by Nambu equations in $D\geq 3$-dimensional phase.
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