we show that the solution to an oscillatory-singularly perturbed ordinary
differential equation may be asymptotically expanded into a sum of oscillating
terms. Each of those terms writes as an oscillating operator acting on the
solution to a non oscillating ordinary differential equation with an
oscillating correction added to it. The expression of the non oscillating
ordinary differential equations are defined by a recurrence relation. We then
apply this result to problems where charged particles are submitted to large
magnetic field

Frenod, Emmanuel

English

arXiv

International audiencewe show that the solution to an oscillatory-singularly perturbed ordinary differential equation may be asymptotically expanded into a sum of oscillating terms. Each of those terms writes as an oscillating operator acting on the solution to a non oscillating ordinary differential equation with an oscillating correction added to it. The expression of the non oscillating ordinary differential equations are defined by a recurrence relation. We then apply this result to problems where charged particles are submitted to large magnetic field

Application of the averaging method to the gyrokinetic plasma

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