A weakly nonlinear stability of centrally symmetric magnetohydrodynamic systems to perturbations involving large scales

Autor:	V. A. Zheligovsky
Rok vydání:	2006
Předmět:	Quadratic equation Classical mechanics Advection Operator (physics) Mathematical analysis General Earth and Planetary Sciences Positive-definite matrix Magnetohydrodynamic drive Anisotropy General Environmental Science Electromagnetic induction Mathematics Eddy diffusion
Zdroj:	Izvestiya, Physics of the Solid Earth. 42:244-253
ISSN:	1555-6506 1069-3513
DOI:	10.1134/s1069351306030074
Popis:	The problem of weakly nonlinear stability of 3-D centrally symmetric magnetohydrodynamic systems to perturbations involving large scales is considered. It is assumed that large space-time scales are absent in the magnetohydrodynamic state under study, which is stable with respect to perturbations whose scales are as small as those of the state itself. Equations derived by asymptotic methods for average fields of perturbations generalize the Navier-Stokes and magnetic induction equations. They include a combined eddy diffusion operator, generally anisotropic and not necessarily negative definite, and additional quadratic terms. An effective method is proposed for the calculation of coefficients of eddy diffusion and advection in equations governing average fields.
Databáze:	OpenAIRE
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