On the quest for generalized Hamiltonian descriptions of 3D-flows generated by curl of a vector potential

Abstract

We study Hamiltonian analysis of three-dimensional advection flow x=v( x) of incompressible nature ∇ · v = 0 assuming that dynamics is generated by the curl of a vector potential v = ∇ × A. More concretely, we elaborate Nambu-Hamiltonian and bi-Hamiltonian characters of such systems under the light of vanishing or non-vanishing of the quantity A · ∇ × A. We present an example (satisfying A · ∇ × A ≠ 0) which can be written as in the form of Nambu-Hamiltonian and bi-Hamiltonian formulations. We present another example (satisfying A · ∇ × A = 0) which we cannot able to write it in the form of a Nambu-Hamiltonian or bi-Hamiltonian system. On the hand, this second example can be manifested in terms of Hamiltonian one-form and yields generalized or vector Hamiltonian equations xi = - εijk∂ ηj/∂ xk.