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- Bogomolny_equations abstract "In mathematics, the Bogomolny equations for magnetic monopoles are the equations FA = *DAφ, where FA is the curvature of a connection A on a G-bundle over a 3-manifold M, φ is a section of the corresponding adjoint bundle and * is the Hodge star operator on M. These equations are named after E. B. Bogomolny.The equations are a dimensional reduction of the self-dual Yang–Mills equations in four dimensions and correspond to global minima of the appropriate action. If M is closed there are only trivial (i.e., flat) solutions.".
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- Bogomolny_equations wikiPageRevisionID "635279856".
- Bogomolny_equations wikiPageWikiLink Adjoint_bundle.
- Bogomolny_equations wikiPageWikiLink Category:Differential_geometry.
- Bogomolny_equations wikiPageWikiLink Connection_(mathematics).
- Bogomolny_equations wikiPageWikiLink Hodge_dual.
- Bogomolny_equations wikiPageWikiLink Hodge_star_operator.
- Bogomolny_equations wikiPageWikiLink Magnetic_monopole.
- Bogomolny_equations wikiPageWikiLink Manifold.
- Bogomolny_equations wikiPageWikiLink Monopole_moduli_space.
- Bogomolny_equations wikiPageWikiLink Yang–Mills_equation.
- Bogomolny_equations wikiPageWikiLink Yang–Mills_theory.
- Bogomolny_equations wikiPageWikiLinkText "Bogomolny equations".
- Bogomolny_equations hasPhotoCollection Bogomolny_equations.
- Bogomolny_equations wikiPageUsesTemplate Template:Citation.
- Bogomolny_equations wikiPageUsesTemplate Template:Eom.
- Bogomolny_equations subject Category:Differential_geometry.
- Bogomolny_equations hypernym FA.
- Bogomolny_equations type FootballMatch.
- Bogomolny_equations type Physic.
- Bogomolny_equations comment "In mathematics, the Bogomolny equations for magnetic monopoles are the equations FA = *DAφ, where FA is the curvature of a connection A on a G-bundle over a 3-manifold M, φ is a section of the corresponding adjoint bundle and * is the Hodge star operator on M. These equations are named after E. B. Bogomolny.The equations are a dimensional reduction of the self-dual Yang–Mills equations in four dimensions and correspond to global minima of the appropriate action.".
- Bogomolny_equations label "Bogomolny equations".
- Bogomolny_equations sameAs m.0j67dxt.
- Bogomolny_equations sameAs Q16963296.
- Bogomolny_equations sameAs Q16963296.
- Bogomolny_equations wasDerivedFrom Bogomolny_equations?oldid=635279856.
- Bogomolny_equations isPrimaryTopicOf Bogomolny_equations.