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'''Topological excitations''' are certain features of classical solutions of [[gauge field theory|gauge field theories]].


Namely, a gauge field theory on a [[manifold]] <math>M</math> with a [[gauge group]] <math>G</math> may possess classical solutions with a (quantized) [[topology|topological]] invariant called ''topological charge''. The term ''topological excitation'' especially refers to a situation when the topological charge is an integral of a localized quantity.


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Examples:<ref>F. A. Bais, Topological excitations in gauge theories; An introduction from the physical point of view. Springer Lecture Notes in Mathematics, vol. 926 (1982)</ref>
 
1) <math> M = R^2 </math>, <math> G=U(1) </math>, the topological charge is called [[magnetic flux]].
 
2) <math> M=R^3 </math>, <math> G=SO(3)/U(1) </math>, the topological charge is called [[magnetic charge]].
 
The concept of a topological excitation is almost synonymous with that of a [[topological defect]].
 
==References==
<!--- See [[Wikipedia:Footnotes]] on how to create references using <ref></ref> tags which will then appear here automatically -->
{{Reflist}}
 
{{DEFAULTSORT:Topological Excitations}}
[[Category:Theoretical physics]]

Revision as of 16:19, 3 June 2013

Topological excitations are certain features of classical solutions of gauge field theories.

Namely, a gauge field theory on a manifold M with a gauge group G may possess classical solutions with a (quantized) topological invariant called topological charge. The term topological excitation especially refers to a situation when the topological charge is an integral of a localized quantity.

Examples:[1]

1) M=R2, G=U(1), the topological charge is called magnetic flux.

2) M=R3, G=SO(3)/U(1), the topological charge is called magnetic charge.

The concept of a topological excitation is almost synonymous with that of a topological defect.

References

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  1. F. A. Bais, Topological excitations in gauge theories; An introduction from the physical point of view. Springer Lecture Notes in Mathematics, vol. 926 (1982)