Bogomolny equations
Appearance
In mathematics, and especially gauge theory, the Bogomolny equation for magnetic monopoles is the equation
where is the curvature of a connection on a principal -bundle over a 3-manifold , is a section of the corresponding adjoint bundle, is the exterior covariant derivative induced by on the adjoint bundle, and is the Hodge star operator on . These equations are named after E. B. Bogomolny and were studied extensively by Michael Atiyah and Nigel Hitchin.[1][2]
The equations are a dimensional reduction of the self-dual Yang–Mills equations from four dimensions to three dimensions, and correspond to global minima of the appropriate action. If is closed, there are only trivial (i.e. flat) solutions.
See also
[edit]- Monopole moduli space
- Ginzburg–Landau theory
- Seiberg–Witten theory
- Bogomol'nyi–Prasad–Sommerfield bound
References
[edit]- ^ Atiyah, Michael; Hitchin, Nigel (1988), The geometry and dynamics of magnetic monopoles, M. B. Porter Lectures, Princeton University Press, ISBN 978-0-691-08480-0, MR 0934202
- ^ Hitchin, N. J. (1982), "Monopoles and geodesics", Communications in Mathematical Physics, 83 (4): 579–602, Bibcode:1982CMaPh..83..579H, doi:10.1007/bf01208717, ISSN 0010-3616, MR 0649818, S2CID 121082095
External links
[edit]- Bogomolny equation on nLab
- "Magnetic_monopole", Encyclopedia of Mathematics, EMS Press, 2001 [1994]