Gaugino condensation: Difference between revisions
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{{Short description|Nonzero gaugino vacuum expectation value in supersymmetry}} |
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In [[ |
In [[quantum field theory]], '''gaugino condensation''' is the nonzero [[vacuum expectation value]] in some models of a bilinear expression constructed in theories with [[supersymmetry]] from the [[superpartner]] of a [[gauge boson]] called the [[gaugino]].<ref name="Lévy1997">{{cite book |author=Maurice Lévy |title=Masses of Fundamental Particles: Cargèse 1996 |url=https://books.google.com/books?id=So1lDKrP-0IC&pg=PA330 |accessdate=2013-08-07 |date=1997-10-31 |publisher=Springer |isbn=978-0-306-45694-7 |pages=330–}}</ref> The [[gaugino]] and the bosonic [[gauge field]] and the [[D-term]] are all components of a supersymmetric [[vector superfield]] in the [[Wess–Zumino gauge]]. |
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:<math> \langle \lambda^a_\alpha \lambda^b_\beta\rangle \sim \delta^{ab}\epsilon_{\alpha\beta}\Lambda^3 </math> |
:<math> \langle \lambda^a_\alpha \lambda^b_\beta\rangle \sim \delta^{ab}\epsilon_{\alpha\beta}\Lambda^3 </math> |
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where <math>\lambda</math> represents the gaugino field (a [[spinor]]) and <math>\Lambda</math> is an energy scale, a and b represent Lie algebra indices and α and β represent [[van der Waerden notation|van der Waerden]] (two component spinor) indices. The mechanism is somewhat analogous to [[chiral symmetry breaking]] and is an example of a [[fermionic condensate]]. |
where <math>\lambda</math> represents the gaugino field (a [[spinor]]) and <math>\Lambda</math> is an energy scale, {{mvar|a}} and {{mvar|b}} represent Lie algebra indices and {{mvar|α}} and {{mvar|β}} represent [[van der Waerden notation|van der Waerden]] (two component spinor) indices. The mechanism is somewhat analogous to [[chiral symmetry breaking]] and is an example of a [[fermionic condensate]]. |
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In the superfield notation, <math>W_\alpha \equiv \overline{D}^2 D_\alpha V</math> is the gauge field strength and is a [[chiral superfield]]. |
In the superfield notation, <math>W_\alpha \equiv \overline{D}^2 D_\alpha V</math> is the gauge field strength and is a [[chiral superfield]]. |
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However, a gaugino condensate definitely breaks [[R-symmetry|U(1)<sub>R</sub> symmetry]] as <math>\lambda^a_\alpha \lambda^b_\beta</math> has an R-charge of 2. |
However, a gaugino condensate definitely breaks [[R-symmetry|U(1)<sub>R</sub> symmetry]] as <math>\lambda^a_\alpha \lambda^b_\beta</math> has an R-charge of 2. |
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==See also== |
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* [[Tachyon condensation]] |
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==References== |
==References== |
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{{Reflist}} |
{{Reflist|100em}} |
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{{DEFAULTSORT:Gaugino Condensation}} |
{{DEFAULTSORT:Gaugino Condensation}} |
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[[Category: |
[[Category:Supersymmetric quantum field theory]] |
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[[Category:Gauge theories]] |
[[Category:Gauge theories]] |
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{{quantum-stub}} |
Latest revision as of 22:16, 31 July 2022
In quantum field theory, gaugino condensation is the nonzero vacuum expectation value in some models of a bilinear expression constructed in theories with supersymmetry from the superpartner of a gauge boson called the gaugino.[1] The gaugino and the bosonic gauge field and the D-term are all components of a supersymmetric vector superfield in the Wess–Zumino gauge.
where represents the gaugino field (a spinor) and is an energy scale, a and b represent Lie algebra indices and α and β represent van der Waerden (two component spinor) indices. The mechanism is somewhat analogous to chiral symmetry breaking and is an example of a fermionic condensate.
In the superfield notation, is the gauge field strength and is a chiral superfield.
is also a chiral superfield and we see that what acquires a nonzero VEV is not the F-term of this chiral superfield. Because of this, gaugino condensation in and of itself does not lead to supersymmetry breaking. If we also have supersymmetry breaking, it is caused by something other than the gaugino condensate.
However, a gaugino condensate definitely breaks U(1)R symmetry as has an R-charge of 2.
See also
[edit]References
[edit]- ^ Maurice Lévy (1997-10-31). Masses of Fundamental Particles: Cargèse 1996. Springer. pp. 330–. ISBN 978-0-306-45694-7. Retrieved 2013-08-07.