Stable topological textures in a classical 2D Heisenberg model

Abstract

We show that stable localized topological soliton textures (skyrmions) with π2 topological charge ≥ 1 exist in a classical 2D Heisenberg model of a ferromagnet with uniaxial anisotropy. For this model the soliton exist only if the number of bound magnons exceeds some threshold value N cr depending on and the effective anisotropy constant K eff. We define soliton phase diagram as the dependence of threshold energies and bound magnons number on anisotropy constant. The phase boundary lines are monotonous for both =1 and >2, while the solitons with =2 reveal peculiar nonmonotonous behavior, determining the transition regime from low to high topological charges. In particular, the soliton energy per topological charge (topological energy density) achieves a minimum neither for =1 nor high charges, but rather for intermediate values =2 or =3.