Hagen Fuchs scite author profile

Topologically stable structures include vortices in a wide variety of matter, such as skyrmions in ferro-and antiferromagnets, and hedgehog point defects in liquid crystals and ferromagnets. These are characterized by integer-valued topological quantum numbers. In this context, closed surfaces are a prominent subject of study as they form a link between fundamental mathematical theorems and real physical systems. Here we perform an analysis on the topology and stability of equilibrium magnetization states for a thin spherical shell with easy-axis anisotropy in normal directions. Skyrmion solutions are found for a range of parameters. These magnetic skyrmions on a spherical shell have two distinct differences compared to their planar counterpart: (i) they are topologically trivial, and (ii) can be stabilized by curvature effects, even when Dzyaloshinskii-Moriya interactions are absent. Due to its specific topological nature a skyrmion on a spherical shell can be simply induced by a uniform external magnetic field.

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Electronic-skin compasses for geomagnetic field-driven artificial magnetoreception and interactive electronics

Bermúdez

et al. 2018

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Finmag: Finite-Element Micromagnetic Simulation Tool

Bisotti¹,

Beg²,

Wang³

et al. 2018

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Hagen Fuchs

Topologically stable magnetization states on a spherical shell: Curvature-stabilized skyrmions

Electronic-skin compasses for geomagnetic field-driven artificial magnetoreception and interactive electronics

Finmag: Finite-Element Micromagnetic Simulation Tool

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