The conformal limit for bimerons in easy-plane chiral magnets

Abstract

We study minimizers m R2 S2 of the energy functional align* Eσ(m) = ∫ R2 ( 12 |∇m|2 +σ2 m · ∇ ×m +σ2 m32 )\, dx\,, align* for 0<σ 1, with prescribed topological degree align* Q(m)=14π ∫ R2m · ∂1 m×∂2m\, dx = 1\,. align* This model arises in thin ferromagnetic films with Dzyaloshinskii-Moriya interaction and easy-plane anisotropy, where these minimizers represent bimeron configurations. We prove their existence, and describe them precisely as perturbations of specific M\"obius maps: we establish in particular that they are localized at scale of order 1/|(σ2)|. The proof follows a strategy introduced by Bernand-Mantel, Muratov and Simon (Arch. Ration. Mech. Anal., 2021) for a similar model with easy-axis anisotropy, but requires several adaptations to deal with the less coercive easy-plane anisotropy and different symmetry properties.