On the dynamical reduction of the Vlasov equation

On the dynamical reduction of the Vlasov equation

The elimination of a fast-time scale from the Vlasov equation by Lie-transform methods is an important step in deriving a reduced Vlasov equation such as the drift-kinetic Vlasov equation or the gyrokinetic Vlasov equation. It is shown here that this dynamical reduction also leads to the introductio...

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Veröffentlicht in:Communications in nonlinear science & numerical simulation 2008-02, Vol.13 (1), p.24-33
1. Verfasser: Brizard, Alain J.
Format: Artikel
Sprache:eng
Schlagworte:
Lie-transform perturbation theory
Vlasov equation
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Zusammenfassung:The elimination of a fast-time scale from the Vlasov equation by Lie-transform methods is an important step in deriving a reduced Vlasov equation such as the drift-kinetic Vlasov equation or the gyrokinetic Vlasov equation. It is shown here that this dynamical reduction also leads to the introduction of polarization and magnetization effects in the reduced Maxwell equations, which ensure that the reduced Vlasov–Maxwell equations possess an exact energy–momentum conservation law.
ISSN:1007-5704
1878-7274
DOI:10.1016/j.cnsns.2007.05.006