Cyrill B. Muratov, Theresa M. Simon, Valeriy V. Slastikov
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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.