TL;DR
This paper explores multimagnetic monopoles arising from an extended SU(2) gauge theory, demonstrating stable solutions with complex magnetic structures through a modified relativistic framework.
Contribution
It introduces a novel extension of the SU(2) gauge group to model multimagnetic monopoles with a first-order Bogomol'nyi bound, enabling the construction of stable multimagnetic solutions.
Findings
Stable multimagnetic monopole solutions demonstrated.
Extension of gauge theory allows for complex magnetic structures.
First-order framework ensures solution stability.
Abstract
In this work we investigate the presence of magnetic monopoles that engender multimagnetic structures, which arise from an appropriate extension of the gauge group. The investigation is based on a modified relativistic theory that contain several gauge and matter fields, leading to a Bogomol'nyi bound and thus to a first order framework, from which stable multimagnetic solutions can be constructed. We illustrate our findings with several examples of stable magnetic monopoles with multimagnetic properties.
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