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Waves in plasmas

Waves in plasmas are an interconnected set of particles and fields which propagates in a periodically repeating fashion. A plasma is a quasineutral, electrically conductive fluid. In the simplest case, it is composed of electrons and a single species of positive ions, but it may also contain multiple ion species including negative ions as well as neutral particles. Due to its electrical conductivity, a plasma couples to electric and magnetic fields. This complex of particles and fields supports a wide variety of waves.

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Terminology and classification

Waves in plasmas can be classified as electromagnetic or electrostatic according to whether or not there is an oscillating magnetic field. Applying Faraday's law of induction to plane waves, we find $\mathbf{k}\times\tilde{\mathbf{E}}=\omega\tilde{\mathbf{B}}$ , implying that an electrostatic wave must be purely longitudinal. An electromagnetic wave, in contrast, must have a transverse component, but may also be partially longitudinal.

Waves can be further classified by the oscillating species. In most plasmas of interest, the electron temperature is comparable to or larger than the ion temperature. This fact, coupled with the much smaller mass of the electron, implies that the electrons are much faster than the ions. An electron mode depends on the mass of the electrons, but the ions may be assumed to be infinitely massive, i.e. stationary. An ion mode depends on the ion mass, but the electrons are assumed to be massless and to redistribute themselves instantaneously according to the Boltzmann relation. Only rarely, e.g. in the lower hybrid oscillation, will a mode depend on both the electron and the ion mass.

The various modes can also be classified according to whether they propagate in an unmagnetized plasma or parallel, perpendicular, or oblique to the stationary magnetic field. Finally, for perpendicular electromagnetic electron waves, the perturbed electric field can be parallel or perpendicular to the stationary magnetic field.

Summary of elementary plasma waves
EM character	oscillating species	conditions	dispersion relation	name
electrostatic	electrons	$\vec B_0=0\ {\rm or}\ \vec k\\|\vec B_0$	$\omega^2=\omega_p^2+(3/2)k^2v_{th}^2$	plasma oscillation (or Langmuir wave)
	electrons	$\vec k\perp\vec B_0$	$\omega^2=\omega_p^2+\omega_c^2=\omega_h^2$	upper hybrid oscillation
	ions	$\vec B_0=0\ {\rm or}\ \vec k\\|\vec B_0$	$\omega^2=k^2v_s^2=k^2\frac{\gamma_eKT_e+\gamma_iKT_i}{M}$	ion acoustic wave
		$\vec k\perp\vec B_0$ (nearly)	$\omega^2=\Omega_c^2+k^2v_s^2$	electrostatic ion cyclotron wave
		$\vec k\perp\vec B_0$ (exactly)	$\omega^2=\omega_i^2=\Omega_c\omega_c$	lower hybrid oscillation
electromagnetic	electrons	$\vec B_0=0$	$\omega^2=\omega_p^2+k^2c^2$	light wave
		$\vec k\perp\vec B_0,\ \vec E_1\\|\vec B_0$	$\frac{c^2k^2}{\omega^2}=1-\frac{\omega_p^2}{\omega^2}$	O wave
		$\vec k\perp\vec B_0,\ \vec E_1\perp\vec B_0$	$\frac{c^2k^2}{\omega^2}=1-\frac{\omega_p^2}{\omega^2}\, \frac{\omega^2-\omega_p^2}{\omega^2-\omega_h^2}$	X wave
		$\vec k\\|\vec B_0$ (right circ. pol.)	$\frac{c^2k^2}{\omega^2}=1-\frac{\omega_p^2/\omega^2}{1-(\omega_c/\omega)}$	R wave (whistler mode)
		$\vec k\\|\vec B_0$ (left circ. pol.)	$\frac{c^2k^2}{\omega^2}=1-\frac{\omega_p^2/\omega^2}{1+(\omega_c/\omega)}$	L wave
	ions	$\vec B_0=0$		none
		$\vec k\\|\vec B_0$	$\omega^2=k^2v_A^2$	Alfvén wave
		$\vec k\perp\vec B_0$	$\frac{\omega^2}{k^2}=c^2\, \frac{v_s^2+v_A^2}{c^2+v_A^2}$	magnetosonic wave