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banks_zaks_fixed_point [2021/04/13 20:59] Scott Lawrence created |
banks_zaks_fixed_point [2021/05/10 05:34] (current) Scott Lawrence [Banks-Zaks fixed point] |
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| + | A Banks-Zaks fixed point is an IR-stable CFT describing long-distance behavior of QCD for certain parameters. The Lagrangian of QCD is | ||
| + | \[ | ||
| + | \mathcal L= | ||
| + | \sum_a \bar\psi_a (i \gamma\partial - m_a ) \psi_a - \frac 1 4 F^2 | ||
| + | \] | ||
| + | where color and spacetime indices have been suppressed. The flavor index $a$ runs over $N_f$ flavors of fermions. | ||
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| + | This theory is asymptotically free (i.e., has a UV-stable fixed point) for $N_f < \frac {33} 2$. For $N_f$ just below that threshold, an IR-stable fixed point is visible in perturbation theory if the fermions are taken to be massless. This fixed point has been found to extend down at least to $N_f \sim 12$ in lattice studies. | ||
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| + | Other theories can have Banks-Zaks fixed points, like SQCD. | ||
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| + | ===== Lattice studies ===== | ||
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| + | Here are some lattice studies: [[https:// | ||
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| + | ===== External links ===== | ||
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| + | * [[https:// | ||
| + | * [[https:// | ||
Last modified: 2021/04/13 20:59
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