Notes on Yang-Mills--Higgs monopoles and dyons on R^D, and Chern-Simons--Higgs solitons on R^(D-2): Dimensional reduction of Chern-Pontryagin densities
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We review work on construction of Monopoles in higher dimensions. These are solutions to a particular class of models descending from Yang--Mills systems on even dimensional bulk, with Spheres as codimensions. The topological lower bounds on the Yang-Mills action translate to Bogomol'nyi lower bounds on the residual Yang-Mills-Higgs systems. Mostly, consideration is restricted to 8 dimensional bulk systems, but extension to the arbitrary case follows systematically. After presenting the monopoles, the corresponding dyons are also constructed. Finally, new Chern-Simons densities expressed in terms of Yang-Mills and Higgs fields are presented. These are defined in all dimensions, including in even dimensional spacetimes. They are constructed by subjecting the dimensionally reduced Chern-Pontryagin densites to further descent by two steps.
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Attractive and repulsive Yang-Mills--Higgs magnetic monopoles on $\mathbb{R}^3$
A new non-Abelian Higgs model on R^3 supports attractive and repulsive monopole phases stabilized by a Higgs analogue of the Chern-Pontryagin charge rather than the standard topological bound.
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