$G_2$-monopoles are solutions to gauge theoretical equations on
$G_2$-manifolds. If the $G_2$-manifolds under consideration are compact, then
any irreducible $G_2$-monopole must have singularities. It is then important to
understand which kind of singularities $G_2$-monopoles can have. We give
examples (in the noncompact case) of non-Abelian monopoles with Dirac type
singularities, and examples of monopoles whose singularities are not of that
type. We also give an existence result for Abelian monopoles with Dirac type
singularities on compact manifolds. This should be one of the building blocks
in a gluing construction aimed at constructing non-Abelian ones.Comment: Lett Math Phys (2016

Oliveira, Goncalo

Letters in Mathematical Physics

English

arXiv

Â© 2016, Springer Science+Business Media Dordrecht.G2-Monopoles are solutions to gauge theoretical equations on G2-manifolds. If the G2-manifolds under consideration are compact, then any irreducible G2-monopole must have singularities. It is then important to understand which kind of singularities G2-monopoles can have. We give examples (in the noncompact case) of non-Abelian monopoles with Dirac type singularities, and examples of monopoles whose singularities are not of that type. We also give an existence result for Abelian monopoles with Dirac type singularities on compact manifolds. This should be one of the building blocks in a gluing construction aimed at constructing non-Abelian ones

Oliveira, G

DukeSpace (Duke Univ.)

G<inf>2</inf>-Monopoles with Singularities (Examples)

Oliveira, G.

MPG.PuRe