Hamiltonian systems on almost cosymplectic manifolds

Abstract

We determine the Hamiltonian vector field on an odd dimensional manifold endowed with almost cosymplectic structure. This is a generalization of the corresponding Hamiltonian vector field on manifolds with almost transitive contact structures, which extends the contact Hamiltonian systems. Applications are presented to the equations of motion on a particular five-dimensional manifold, the extended Siegel-Jacobi upper-half plane XJ1. The XJ1 manifold is endowed with a generalized transitive almost cosymplectic structure, an almost cosymplectic structure, more general than transitive almost contact structure and cosymplectic structure.The equations of motion on XJ1 extend the Riccati equations of motion on the four-dimensional Siegel-Jacobi manifold XJ1 attached to a linear Hamiltonian in the generators of the real Jacobi group GJ1(R).