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On a model of magnetization switching by spin-polarized current

This paper is concerned with global existence of weak solutions to a model equations of magnetization reversal by spin-polarized current in a layer introduced in [19]. The local magnetization of the ferromagnet satisfies the usual Landau-Lifshitz equation which is coupled to the nonlinear heat equat...

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Bibliographic Details
Published in:Japan journal of industrial and applied mathematics 2006-02, Vol.23 (1), p.105-125
Main Authors: Hamdache, K., Hamroun, D., Tilioua, M.
Format: Article
Language:English
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Summary:This paper is concerned with global existence of weak solutions to a model equations of magnetization reversal by spin-polarized current in a layer introduced in [19]. The local magnetization of the ferromagnet satisfies the usual Landau-Lifshitz equation which is coupled to the nonlinear heat equation satisfied by the spin accumulation field defined in all the layer. The coupling is due to the contact interaction energy. We use an hyperbolic regularization method with penalization of the saturation constraint satisfied by the local magnetization to prove global existence result, in any finite time interval, of weak solutions with finite energy. We present other models of equations describing the magnetization switching by spin-polarized current and show that our method can be used to solve them.[PUBLICATION ABSTRACT]
ISSN:0916-7005
1868-937X
DOI:10.1007/BF03167501