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In [[theoretical physics]], '''Montonen–Olive duality''' is the oldest known example of [[S-duality]] or a [[strong-weak duality]]. It generalizes the electro-magnetic symmetry of [[Maxwell's equations]]. It is named after [[Finland|Finnish]] [[Claus Montonen]] and [[United Kingdom|British]] [[David Olive]].
 
== Overview ==
In a four-dimensional [[Yang-Mills]] theory with [[extended supersymmetry|''N''=4 supersymmetry]], which is the case where the Montonen–Olive duality applies, one obtains a physically equivalent theory if one replaces the gauge [[coupling constant]] ''g'' by 1/''g''. This also involves an interchange of the electrically charged particles and [[magnetic monopole]]s. See also [[Seiberg duality]].
 
In fact, there exists a larger [[modular group|SL(2,'''Z''')]] symmetry where both ''g'' as well as [[theta-angle]] are transformed non-trivially.
 
== Mathematical formalism ==
The gauge coupling and [[theta-angle]] can be combined together to form one complex coupling
:<math> \tau = \frac{\theta}{2\pi}+\frac{4\pi i}{g^2}.</math>
Since the theta-angle is periodic, there is a symmetry
:<math> \tau \mapsto \tau + 1.</math>
The quantum mechanical theory with gauge group ''G'' (but not the classical theory, except in the case when the ''G'' is [[abelian group|abelian]]) is also invariant under the symmetry
:<math> \tau \mapsto \frac{-1}{n_G\tau}</math>
while the gauge group ''G'' is simultaneously replaced by its [[Langlands dual group]] <sup>''L''</sup>''G'' and <math>n_G</math> is an integer depending on the choice of gauge group. In the case the [[theta-angle]] is 0, this reduces to the simple form of Montonen–Olive duality stated above.
 
== References ==
* [[Edward Witten]], [http://math.berkeley.edu/index.php?module=documents&JAS_DocumentManager_op=viewDocument&JAS_Document_id=116 ''Notes from the 2006 Bowen Lectures''], an overview of Electric-Magnetic duality in gauge theory and its relation to the [[Langlands program]]
 
{{DEFAULTSORT:Montonen-Olive duality}}
[[Category:Quantum field theory]]
[[Category:Duality theories]]
 
 
{{quantum-stub}}

Revision as of 12:52, 6 May 2013

In theoretical physics, Montonen–Olive duality is the oldest known example of S-duality or a strong-weak duality. It generalizes the electro-magnetic symmetry of Maxwell's equations. It is named after Finnish Claus Montonen and British David Olive.

Overview

In a four-dimensional Yang-Mills theory with N=4 supersymmetry, which is the case where the Montonen–Olive duality applies, one obtains a physically equivalent theory if one replaces the gauge coupling constant g by 1/g. This also involves an interchange of the electrically charged particles and magnetic monopoles. See also Seiberg duality.

In fact, there exists a larger SL(2,Z) symmetry where both g as well as theta-angle are transformed non-trivially.

Mathematical formalism

The gauge coupling and theta-angle can be combined together to form one complex coupling

τ=θ2π+4πig2.

Since the theta-angle is periodic, there is a symmetry

ττ+1.

The quantum mechanical theory with gauge group G (but not the classical theory, except in the case when the G is abelian) is also invariant under the symmetry

τ1nGτ

while the gauge group G is simultaneously replaced by its Langlands dual group LG and nG is an integer depending on the choice of gauge group. In the case the theta-angle is 0, this reduces to the simple form of Montonen–Olive duality stated above.

References


Template:Quantum-stub