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We investigate a generalized nonlinear O (3) model in three space dimensions where the fields are maps from R^3 to S^2. Such maps are classified by a homotopy invariant called the Hopf number which takes integer values. The model exhibits soliton solutions of closed vortex type which have a lower topological bound on their energies. We numerically compute the fields for topological charge 1 and 2 and discuss their shapes and binding energies. The effect of an additional potential term is considered and an approximation is given for the spectrum of slowly rotating solitons.
Gladikowski et al. (Wed,) studied this question.
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