Electromagnetic solitary waves in magnetized plasmas
- 1 August 1985
- journal article
- research article
- Published by Cambridge University Press (CUP) in Journal of Plasma Physics
- Vol. 34 (1) , 103-114
- https://doi.org/10.1017/s0022377800002713
Abstract
A Hamiltonian formulation, in terms of a non-canonical Poisson bracket, is presented for a nonlinear fluid system that includes reduced magnetohydro-dynamics and the Hasegawa–Mima equation as limiting cases. The single-helicity and axisymmetric versions possess three nonlinear Casimir invariants, from which a generalized potential can be constructed. Variation of the generalized potential yields a description of exact nonlinear stationary states. The new equilibria, allowing for plasma flow as well as partial electron adiabaticity, are distinct from those found in conventional magnetohydrodynamic theory. They differ from electrostatic stationary states in containing plasma current and magnetic field excitation. One class of steady-state solutions is shown to provide a simple electromagnetic generalization of drift-solitary waves.Keywords
This publication has 11 references indexed in Scilit:
- Alfvén vortex solution in a homogeneous magnetized plasmaPhysics Letters A, 1984
- Hamiltonian formulation of reduced magnetohydrodynamicsPhysics of Fluids, 1984
- Nonlinear reduced fluid equations for toroidal plasmasPhysics of Fluids, 1984
- Ballooning vortex in a magnetized plasmaPhysics Letters A, 1984
- Noncanonical Hamiltonian field theory and reduced MHDContemporary Mathematics, 1984
- Reduced magnetohydrodynamics and the Hasegawa–Mima equationPhysics of Fluids, 1983
- Baroclinic solitary waves with radial symmetryDynamics of Atmospheres and Oceans, 1979
- Dynamics of high β tokamaksPhysics of Fluids, 1977
- Stationary Spectrum of Strong Turbulence in Magnetized Nonuniform PlasmaPhysical Review Letters, 1977
- Nonlinear, three-dimensional magnetohydrodynamics of noncircular tokamaksPhysics of Fluids, 1976