Abstract
We have studied the existence de self-dual solitons in a gauged version of the baby Skyrme model in which the gauge field dynamics is governed by the Maxwell-Chern-Simons action. For such a purpose, we have developed a detailed implementation of the Bogomol'nyi-Prasad-Sommerfield formalism providing the self-dual equations whose solutions saturate the energy lower bound. Such a bound related to the topological charge of the Skyrme field becomes quantized whereas both the total magnetic flux and the total electrical charge are not. We have found two types of self-dual Skyrme field profiles: the first is described by a solution which decays following an exponential-law ($e^{-\alpha r^2}$, $\alpha>0$); the second is portrayed by a solution having a power-law decay ($r^{-\beta}$, $\beta>0$). On other hand, in both cases the asymptotic behavior of the gauge field is similar to the one presented in the context of the Abelian Higgs models describing Abrikosov-Nielsen-Olesen charged vortices. Other interesting feature we highlight is the localized magnetic flux inversion, a property does not observed in others gauged baby Skyrme models already studied in literature. Numerical results are presented for rotationally symmetrical field configurations by remarking some of its essential features.
Highlights
The Skyrme model [1] is a nonlinear field theory which is originally defined in (3 þ 1) dimensions and whose topological soliton solutions are called skyrmions. It has been a prolific subject in several branches of physics
It is currently understood as an effective field theory for nuclear phenomena describing several hadron and nucleon properties [2], circumventing some technical difficulties present in the underlining quantum chromodynamics
In the realm of condensed matter physics, it has caused exciting research to be applied in the description of some physical systems, such as liquid helium [3], the quantum Hall effect [4], Bose-Einstein condensates [5], chiral nematic liquid crystals [6], magnetic materials [7], and superconductors [8]
Summary
The Skyrme model [1] is a nonlinear field theory which is originally defined in (3 þ 1) dimensions and whose topological soliton solutions are called skyrmions It has been a prolific subject in several branches of physics. The sigma model and Skyrme terms are invariant under SOð3Þ global symmetry, whereas the potential breaks partially but preserves the Uð1Þ subgroup Such a potential has a unique vacuum configuration and must satisfy the condition VðφnÞ → 0 when φn → 1. The study of BPS solitons in the gauged restricted baby Skyrme model has already been performed in some cases: the Skyrme field minimally coupled to the Maxwell field [13,14] and the Chern-Simons gauge field [15,16,17].
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