Creat membership Creat membership
Sign in

Forgot password?

Confirm
  • Forgot password?
    Sign Up
  • Confirm
    Sign In
Creat membership Creat membership
Sign in

Forgot password?

Confirm
  • Forgot password?
    Sign Up
  • Confirm
    Sign In
Collection

toTop

If you have any feedback, Please follow the official account to submit feedback.

Turn on your phone and scan

home > search >

Cyclotron waves in a non-neutral plasma column

Author:
Dubin, Daniel H. E.  


Journal:
PHYSICS OF PLASMAS


Issue Date:
2013


Abstract(summary):

A kinetic theory of linear electrostatic plasma waves with frequencies near the cyclotron frequency Omega(cs) of a given plasma species s is developed for a multispecies non-neutral plasma column with general radial density and electric field profiles. Terms in the perturbed distribution function up to O(1/Omega(2)(cs)) are kept, as are the effects of finite cyclotron radius r(c) up to O(r(c)(2)). At this order, the equilibrium distribution is not Maxwellian if the plasma temperature or rotation frequency is not uniform. For r(c) -> 0, the theory reproduces cold-fluid theory and predicts surface cyclotron waves propagating azimuthally. For finite r(c), the wave equation predicts that the surface wave couples to radially and azimuthally propagating Bernstein waves, at locations where the wave frequency equals the local upper hybrid frequency. The equation also predicts a second set of Bernstein waves that do not couple to the surface wave, and therefore have no effect on the external potential. The wave equation is solved both numerically and analytically in the WKB approximation, and analytic dispersion relations for the waves are obtained. The theory predicts that both types of Bernstein wave are damped at resonances, which are locations where the Doppler-shifted wave frequency matches the local cyclotron frequency as seen in the rotating frame. (C) 2013 AIP Publishing LLC. [http://dx.doi.org/10.1063/1.4802101]


Similar Literature

Submit Feedback

This function is a member function, members do not limit the number of downloads