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Parametrically forced sine-Gordon equation and domain wall dynamics in ferromagnets

Vadim ZharnitskyDivision of Applied Mathematics, Brown University, Providence, Rhode Island 02912Igor MitkovDivision of Applied Mathematics, Brown University, Providence, Rhode Island 02912Mark LeviDivision of Applied Mathematics, Brown University, Providence, Rhode Island 02912
1998en
ABI

Аннотация

A parametrically forced sine-Gordon equation with a fast periodic mean-zero forcing is considered. It is shown that $\ensuremath{\pi}$ kinks represent a class of solitary-wave solutions of the equation. This result is applied to quasi-one-dimensional ferromagnets with an easy-plane anisotropy, in a rapidly oscillating magnetic field. In this case the $\ensuremath{\pi}$-kink solution we have introduced corresponds to the uniform ``true'' domain-wall motion, since the magnetization directions on opposite sides of the wall are antiparallel. In contrast to previous work, no additional anisotropy is required to obtain a true domain wall. Numerical simulations showed good qualitative agreement with the theory.

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