磁天幕问题中高阶最小值的存在性

Cyrill B. Muratov, Theresa M. Simon, Valeriy V. Slastikov
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引用次数: 0

摘要

我们证明了在描述具有 Dzyaloshinskii-Moriya 相互作用的超薄铁磁薄膜中磁化的变分模型中,存在拓扑上非难的能量最小化映射,即从平面上的有界域到 $\mathbb S^2$ 的给定正度映射。我们的策略是在精心选择的低度对象位置插入微小截断的贝拉文-波利亚科夫剖面,从而使总能量增加严格低于预期的迪里夏特能量贡献,排除了最小化序列极限中的度损失。我们还证明,在合适的参数体系中,这些高阶最小化序列集中于点-相似基里米尼构型。
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Existence of higher degree minimizers in the magnetic skyrmion problem
We demonstrate existence of topologically nontrivial energy minimizing maps of a given positive degree from bounded domains in the plane to $\mathbb S^2$ in a variational model describing magnetizations in ultrathin ferromagnetic films with Dzyaloshinskii-Moriya interaction. Our strategy is to insert tiny truncated Belavin-Polyakov profiles in carefully chosen locations of lower degree objects such that the total energy increase lies strictly below the expected Dirichlet energy contribution, ruling out loss of degree in the limits of minimizing sequences. The argument requires that the domain be either sufficiently large or sufficiently slender to accommodate a prescribed degree. We also show that these higher degree minimizers concentrate on point-like skyrmionic configurations in a suitable parameter regime.
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