Stability of moving Néel walls in ferromagnetic thin films

arXiv - MATH - Spectral Theory Pub Date : 2024-09-06 DOI:arxiv-2409.04023

Antonio Capella, Christof Melcher, Lauro Morales, Ramón G. Plaza

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Abstract

This paper studies moving 180-degree N\'eel walls in ferromagnetic thin films under the reduced model for the in-plane magnetization proposed by Capella, Melcher and Otto [5], in the case when a sufficiently weak external magnetic field is applied. It is shown that the linearization around the moving N\'eel wall's phase determines a spectral problem that is a relatively bounded perturbation of the linearization around the static N\'eel wall, which is the solution when the external magnetic field is set to zero and which is spectrally stable. Uniform resolvent-type estimates for the linearized operator around the static wall are established in order to prove the spectral stability of the moving wall upon application of perturbation theory for linear operators. The spectral analysis is the basis to prove, in turn, both the decaying properties of the generated semigroup and the nonlinear stability of the moving N\'eel wall under small perturbations, in the case of a sufficiently weak external magnetic field. The stability of the static N\'eel wall, which was established in a companion paper [4], plays a key role to obtain the main result.

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铁磁薄膜中移动奈尔壁的稳定性

本文根据 Capella、Melcher 和 Otto [5]提出的面内磁化还原模型，研究了在施加足够弱的外部磁场时，铁磁薄膜中的 180 度移动 N\'eel 墙。研究表明，围绕运动钕磁墙相位的线性化决定了一个谱问题，它是围绕静态钕磁墙线性化的相对有界扰动，而静态钕磁墙是外磁场设为零时的解，它在光谱上是稳定的。建立了静态壁周围线性化算子的均匀解析型估计，以便在应用线性算子的扰动理论时证明运动壁的谱稳定性。在谱分析的基础上，反过来证明了在足够弱的外部磁场情况下，所产生的半群的衰减特性和运动镍镉墙在小扰动下的非线性稳定性。静态鳗鱼壁的稳定性在另一篇论文[4]中已经建立，它对获得主要结果起着关键作用。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - Spectral Theory

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