English

Amplitude Equations for Electrostatic Waves: multiple species

patt-sol 2009-10-30 v1 Condensed Matter Pattern Formation and Solitons Plasma Physics

Abstract

The amplitude equation for an unstable electrostatic wave is analyzed using an expansion in the mode amplitude A(t)A(t). In the limit of weak instability, i.e. γ0+\gamma\to 0^+ where γ\gamma is the linear growth rate, the nonlinear coefficients are singular and their singularities predict the dependence of A(t)A(t) on γ\gamma. Generically the scaling A(t)=γ5/2r(γt)|A(t)|=\gamma^{5/2}r(\gamma t) as γ0+\gamma\to 0^+ is required to cancel the coefficient singularities to all orders. This result predicts the electric field scaling Ekγ5/2|E_k|\sim\gamma^{5/2} will hold universally for these instabilities (including beam-plasma and two-stream configurations) throughout the dynamical evolution and in the time-asymptotic state. In exceptional cases, such as infinitely massive ions, the coefficients are less singular and the more familiar trapping scaling Ekγ2|E_k|\sim\gamma^2 is recovered.

Keywords

Cite

@article{arxiv.patt-sol/9706001,
  title  = {Amplitude Equations for Electrostatic Waves: multiple species},
  author = {John David Crawford and Anandhan Jayaraman},
  journal= {arXiv preprint arXiv:patt-sol/9706001},
  year   = {2009}
}

Comments

41 pages (Latex/RevTex), 1 postscript figure included (psfig). Figure also available in hard copy from the authors