Small time-periodic solutions of equations of magnetohydrodynamics as a singularly perturbed problem

Štědrý, Milan; Vejvoda, Otto

doi:10.21136/AM.1983.104046

Geodesic

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Small time-periodic solutions of equations of magnetohydrodynamics as a singularly perturbed problem

Štědrý, Milan ; Vejvoda, Otto

Applications of Mathematics, Tome 28 (1983) no. 5, pp. 344-356.

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Résumé

This paper deals with a system of equations describing the motion of viscous electrically conducting incompressible fluid in a bounded three dimensional domain whose boundary is perfectly conducting. The displacement current appearing in Maxwell's equations, $\epsilon E_t$ is not neglected. It is proved that for a small periodic force and small positive #\epsilon# there exists a locally unique periodic solution of the investigated system. For $\epsilon \rightarrow 0$, these solutions are shown to convergeto a solution of the simplified (and usually considered) system of equations of magnetohydrodynamics.

MR Zbl

DOI : 10.21136/AM.1983.104046

Classification : 35A07, 35B10, 35B25, 76W05
Keywords: electrically conducting; bounded three dimensional domain; boundary perfectly conducting; displacement current; Maxwell’s equations; small periodic force; small positive epsilon; locally unique periodic solution

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     title = {Small time-periodic solutions of equations of magnetohydrodynamics as a singularly perturbed problem},
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Štědrý, Milan; Vejvoda, Otto. Small time-periodic solutions of equations of magnetohydrodynamics as a singularly perturbed problem. Applications of Mathematics, Tome 28 (1983) no. 5, pp. 344-356. doi : 10.21136/AM.1983.104046. http://geodesic.mathdoc.fr/articles/10.21136/AM.1983.104046/

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