Peccei–Quinn theory

(Redirected from Peccei–Quinn symmetry)

In particle physics, the Peccei–Quinn theory is a well-known, long-standing proposal for the resolution of the strong CP problem formulated by Roberto Peccei and Helen Quinn in 1977.[1][2] The theory introduces a new anomalous symmetry to the Standard Model along with a new scalar field which spontaneously breaks the symmetry at low energies, giving rise to an axion that suppresses the problematic CP violation. This model has long since been ruled out by experiments and has instead been replaced by similar invisible axion models which utilize the same mechanism to solve the strong CP problem.

Overview

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Quantum chromodynamics (QCD) has a complicated vacuum structure which gives rise to a CP violating θ-term in the Lagrangian. Such a term can have a number of non-perturbative effects, one of which is to give the neutron an electric dipole moment. The absence of this dipole moment in experiments[3] requires the fine-tuning of the θ-term to be very small, something known as the strong CP problem. Motivated as a solution to this problem, Peccei–Quinn (PQ) theory introduces a new complex scalar field   in addition to the standard Higgs doublet.[4] This scalar field couples to d-type quarks through Yukawa terms, while the Higgs now only couples to the up-type quarks. Additionally, a new global chiral anomalous U(1) symmetry is introduced, the Peccei–Quinn symmetry, under which   is charged, requiring some of the fermions also have a PQ charge. The scalar field also has a potential

 

where   is a dimensionless parameter and   is known as the decay constant. The potential results in   having the vacuum expectation value of   at the electroweak phase transition.

Spontaneous symmetry breaking of the Peccei–Quinn symmetry below the electroweak scale gives rise to a pseudo-Goldstone boson known as the axion  , with the resulting Lagrangian taking the form[5]

 

where the first term is the Standard Model (SM) and axion Lagrangian which includes axion-fermion interactions arising from the Yukawa terms. The second term is the CP violating θ-term, with   the strong coupling constant,   the gluon field strength tensor, and   the dual field strength tensor. The third term is known as the color anomaly, a consequence of the Peccei–Quinn symmetry being anomalous, with   determined by the choice of PQ charges for the quarks. If the symmetry is also anomalous in the electromagnetic sector, there will additionally be an anomaly term coupling the axion to photons. Due to the presence of the color anomaly, the effective   angle is modified to  , giving rise to an effective potential through instanton effects, which can be approximated in the dilute gas approximation as

 

To minimize the ground state energy, the axion field picks the vacuum expectation value  , with axions now being excitations around this vacuum. This prompts the field redefinition   which leads to the cancellation of the   angle, dynamically solving the strong CP problem. It is important to point out that the axion is massive since the Peccei–Quinn symmetry is explicitly broken by the chiral anomaly, with the axion mass roughly given in terms of the pion mass and pion decay constant as  .

Invisible axion models

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For the Peccei–Quinn model to work, the decay constant must be set at the electroweak scale, leading to a heavy axion. Such an axion has long been ruled out by experiments, for example through bounds on rare kaon decays  .[6] Instead, there are a variety of modified models called invisible axion models which introduce the new scalar field   independently of the electroweak scale, enabling much larger vacuum expectation values, hence very light axions.

The most popular such models are the KimShifmanVainshtein–Zakharov (KSVZ)[7][8] and the DineFischler–Srednicki–Zhitnisky (DFSZ)[9][10] models. The KSVZ model introduces a new heavy quark doublet with PQ charge, acquiring its mass through a Yukawa term involving  . Since in this model the only fermions that carry a PQ charge are the heavy quarks, there are no tree-level couplings between the SM fermions and the axion. Meanwhile, the DFSZ model replaces the usual Higgs with two PQ charged Higgs doublets,   and  , that give mass to the SM fermions through the usual Yukawa terms, while the new scalar only interacts with the standard model through a quartic coupling  . Since the two Higgs doublets carry PQ charge, the resulting axion couples to SM fermions at tree-level.

See also

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References

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  1. ^ Peccei, R.D.; Quinn, H.R. (20 June 1977). "CP Conservation in the Presence of Pseudoparticles". Physical Review Letters. 38 (25): 1440–1443. Bibcode:1977PhRvL..38.1440P. doi:10.1103/PhysRevLett.38.1440.
  2. ^ Peccei, R.D.; Quinn, H.R. (15 September 1977). "Constraints imposed by CP conservation in the presence of pseudoparticles". Physical Review D. 16 (6): 1791–1797. Bibcode:1977PhRvD..16.1791P. doi:10.1103/PhysRevD.16.1791.
  3. ^ Baker, C.A.; Doyle, D.D.; Geltenbort, P.; Green, K.; van der Grinten, M.G.D.; Harris, P.G.; Iaydjiev, P.; Ivanov, S.N.; May, D.J.R. (27 September 2006). "Improved experimental limit on the electric dipole moment of the neutron". Physical Review Letters. 97 (13): 131801. arXiv:hep-ex/0602020. Bibcode:2006PhRvL..97m1801B. doi:10.1103/PhysRevLett.97.131801. PMID 17026025. S2CID 119431442.
  4. ^ Marsh, D.J.E. (1 July 2016). "Axion Cosmology". Physics Reports. 643: 1–79. arXiv:1510.07633. Bibcode:2016PhR...643....1M. doi:10.1016/j.physrep.2016.06.005. S2CID 119264863.
  5. ^ Peccei, R. D. (2008). "The Strong CP Problem and Axions". In Kuster, Markus; Raffelt, Georg; Beltrán, Berta (eds.). Axions: Theory, Cosmology, and Experimental Searches. Lecture Notes in Physics. Vol. 741. pp. 3–17. arXiv:hep-ph/0607268. doi:10.1007/978-3-540-73518-2_1. ISBN 978-3-540-73517-5. S2CID 119482294.
  6. ^ Asano, Y.; Kikutani, E.; Kurokawa, S.; Miyachi, T.; Miyajima, M.; Nagashima, Y.; Shinkawa, T.; Sugimoto, S.; Yoshimura, Y. (3 December 1981). "Search for a rare decay mode K+ -> \pi+vv and axion". Physics Letters B. 107 (1–2): 159–162. doi:10.1016/0370-2693(81)91172-2.
  7. ^ Kim, J. E. (9 July 1979). "Weak-Interaction Singlet and Strong CP Invariance". Phys. Rev. Lett. 43 (2): 103–107. Bibcode:1979PhRvL..43..103K. doi:10.1103/PhysRevLett.43.103.
  8. ^ Shifman, M.A.; Vainshtein, A.I.; Zakharov V.I. (28 April 1980). "Can confinement ensure natural CP invariance of strong interactions?". Nuclear Physics B. 166 (3): 493–506. Bibcode:1980NuPhB.166..493S. doi:10.1016/0550-3213(80)90209-6.
  9. ^ Dine, M.; Fischler, W.; Srednicki, M. (27 August 1981). "A simple solution to the strong CP problem with a harmless axion". Physics Letters B. 104 (3): 199–202. Bibcode:1981PhLB..104..199D. doi:10.1016/0370-2693(81)90590-6.
  10. ^ Zhitnitsky, A.R. (1980). "On possible suppression of the axion hadron interactions". Sov. J. Nucl. Phys. 31: 206.

Further reading

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  • Sarkar, U. (2008). "Peccei–Quinn Symmetry". Particle and Astroparticle Physics. Taylor & Francis. pp. 191–197. ISBN 978-1-58488-931-1.