The Poisson Realization of so(2, 2k+2) on Magnetic Leaves

Abstract

Let R2k+1*= R2k+1\ 0\ (k 1) and π: R2k+1* S2k be the map sending r∈ R2k+1* to r | r|∈ S2k. Denote by P R2k+1* the pullback by π of the canonical principal SO(2k)-bundle SO(2k+1) S2k . Let E R2k+1* be the associated co-adjoint bundle and E T* R2k+1* be the pullback bundle under projection map T* R2k+1* R2k+1*. The canonical connection on SO(2k+1) S2k turns E into a Poisson manifold. The main result here is that the real Lie algebra so(2, 2k+2) can be realized as a Lie subalgebra of the Poisson algebra (C∞( O), \, \), where O is a symplectic leave of E of special kind. Consequently, in view of the earlier result of the author, an extension of the classical MICZ Kepler problems to dimension 2k+1 is obtained. The hamiltonian, the angular momentum, the Lenz vector and the equation of motion for this extension are all explicitly worked out.