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Asymmetric domain walls of small angle in soft ferromagnetic films
Published 7 Dec 2014 in math.AP, math-ph, and math.MP | (1412.2382v1)
Abstract: We focus on a special type of domain walls appearing in the Landau-Lifshitz theory for soft ferromagnetic films. These domain walls are divergence-free $S2$-valued transition layers that connect two directions in $S2$ (differing by an angle $2\theta$) and minimize the Dirichlet energy. Our main result is the rigorous derivation of the asymptotic structure and energy of such "asymmetric" domain walls in the limit $\theta \to 0$. As an application, we deduce that a supercritical bifurcation causes the transition from symmetric to asymmetric walls in the full micromagnetic model.
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