Abstract:
We describe the derivation of Vlasov–Maxwell equation from classical
Lagrangian, and a similar derivation of the Vlasov–Poisson–Poisson charged
gravitating particles. We derive electromagnetic hydrodynamic equations and
present them to the Godunov's double divergence form. For them we get
generalized Lagrange identity and compare it. Analyzes the steady-state
solutions of the Vlasov–Poisson–Poisson equation: their types is changing
at a certain critical mass having a clear physical meaning. The consequence
is the different behavior of particles - recession or collapse trajectories.
We investigate topology of solutions of those hydrodynamic equations due to
Arnold–Kozlov commuting vector fields, and connection to Hamilton–Jacobi
method.