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Plasma torus dynamos versus laminar plasma dynamos

Plasma Physics 2008-10-21 v1 Classical Physics

Abstract

Earlier Wang et al [Phys Plasmas (2002)] have estimated a growth rate for the magnetic field of γ=0.055{\gamma}=0.055 and flow ionization velocity of 51km/s51{km}/{s} in a laminar plasma slow dynamo mode for aspect ratio of r0/L0.6{r_{0}}/L\approx{0.6}, where r0r_{0} is the internal straight cylinder radius, and L is the length scale of the plasma cylinder. In this paper, fast dynamo modes in curved Riemannian heliotron are shown to be excited on a plasma flow yielding a growth rate of γ=0.318{\gamma}=0.318 for an aspect ratio of r0/L0.16{r_{0}}/L\approx{0.16}. It is interesting to note that the first growth rate was obtained in the Wang et al slow dynamo, where the magnetic Reynolds number of Rem=210Re_{m}=210, while in the second one considered in this paper one uses the limit of RemRe_{m}\to{\infty}. These growth rates γ{\gamma} are computed by applying the fast dynamo limit limη0γ(η)>0lim_{{\eta}\to{0}}{\gamma}(\eta)>0. This limit is used in the self-induced equation, without the need to solve these equations to investigate the fast dynamo action of the flow. In this sense the fast dynamo seems to be excited by the elongation of the plasma device as suggested by Wang group. The Frenet curvature of the tube is given by κ00.5m1{\kappa}_{0}\approx{0.5 m^{-1}}. It is suggested that the small Perm torus could be twisted [Dobler et al, Phys Rev E (2003)] in order to enhance even more the fast dynamo effect. By considering the stability of the plasma torus one obtains a value for the fast dynamo growth rate as high as γ=1.712{\gamma}=1.712 from a general expression γ=0.16ω{\gamma}=0.16{\omega} and a toroidal oscillation of a chaotic flow of ω=2π6{\omega}=\frac{2{\pi}}{6}.

Keywords

Cite

@article{arxiv.0810.3602,
  title  = {Plasma torus dynamos versus laminar plasma dynamos},
  author = {Garcia de Andrade},
  journal= {arXiv preprint arXiv:0810.3602},
  year   = {2008}
}

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