A Feynman diagram (box diagram) for photon–photon scattering; one photon scatters from the transient vacuum charge fluctuations of the other.

In quantum electrodynamics (QED), the Schwinger limit is a scale above which the electromagnetic field is expected to become nonlinear. The limit was first derived in one of QED's earliest theoretical successes by Fritz Sauter in 1931[1] and discussed further by Werner Heisenberg and his student Hans Heinrich Euler.[2] The limit, however, is commonly named in the literature[3] for Julian Schwinger, who derived the leading nonlinear corrections to the fields and calculated the rate of electron–positron pair production in a strong electric field.[4] The limit is typically reported as a maximum electric field or magnetic field before nonlinearity for the vacuum of

where me is the mass of the electron, c is the speed of light in vacuum, qe is the elementary charge, and ħ is the reduced Planck constant. These are enormous field strengths. Such an electric field is capable of accelerating a proton from rest to the maximum energy attained by protons at the Large Hadron Collider in only approximately 5 micrometers. The magnetic field is associated with birefringence of the vacuum and is exceeded on magnetars.

In vacuum, the classical Maxwell's equations are perfectly linear differential equations. This implies – by the superposition principle – that the sum of any two solutions to Maxwell's equations is another solution to Maxwell's equations. For example, two intersecting beams of light should simply add together their electric fields and pass right through each other. Thus Maxwell's equations predict the impossibility of any but trivial elastic photon–photon scattering. In QED, however, non-elastic photon–photon scattering becomes possible when the combined energy is large enough to create virtual electron–positron pairs spontaneously, illustrated by the Feynman diagram in the adjacent figure. This creates nonlinear effects that are approximately described by Euler and Heisenberg's nonlinear variant of Maxwell's equations.

A single plane wave is insufficient to cause nonlinear effects, even in QED.[4] The basic reason for this is that a single plane wave of a given energy may always be viewed in a different reference frame, where it has less energy (the same is the case for a single photon). A single wave or photon does not have a center-of-momentum frame where its energy must be at minimal value. However, two waves or two photons not traveling in the same direction always have a minimum combined energy in their center-of-momentum frame, and it is this energy and the electric field strengths associated with it, which determine particle–antiparticle creation, and associated scattering phenomena.

Photon–photon scattering and other effects of nonlinear optics in vacuum is an active area of experimental research, with current or planned technology beginning to approach the Schwinger limit.[5] It has already been observed through inelastic channels in SLAC Experiment 144.[6][7] However, the direct effects in elastic scattering have not been observed. As of 2012, the best constraint on the elastic photon–photon scattering cross section belonged to PVLAS, which reported an upper limit far above the level predicted by the Standard Model.[8]

Proposals were made to measure elastic light-by-light scattering using the strong electromagnetic fields of the hadrons collided at the LHC.[9] In 2019, the ATLAS experiment at the LHC announced the first definitive observation of photon–photon scattering, observed in lead ion collisions that produced fields as large as 1025 V/m, well in excess of the Schwinger limit.[10] Observation of a cross section larger or smaller than that predicted by the Standard Model could signify new physics such as axions, the search of which is the primary goal of PVLAS and several similar experiments. ATLAS observed more events than expected, potentially evidence that the cross section is larger than predicted by the Standard Model, but the excess is not yet statistically significant.[11]

The planned, funded ELI–Ultra High Field Facility, which will study light at the intensity frontier, is likely to remain well below the Schwinger limit[12] although it may still be possible to observe some nonlinear optical effects.[13] The Station of Extreme Light (SEL) is another laser facility under construction which should be powerful enough to observe the effect.[14] Such an experiment, in which ultra-intense light causes pair production, has been described in the popular media as creating a "hernia" in spacetime.[15]

See also

References

  1. F. Sauter (1931). "Über das Verhalten eines Elektrons im homogenen elektrischen Feld nach der relativistischen Theorie Diracs". Zeitschrift für Physik (82nd ed.) (published November 1931). 69 (11–12): 742–764. Bibcode:1931ZPhy...69..742S. doi:10.1007/BF01339461. ISSN 1434-6001. S2CID 122120733. Wikidata Q60698281.
  2. Werner Heisenberg; Hans Heinrich Euler (1936). "Folgerungen aus der Diracschen Theorie des Positrons". Zeitschrift für Physik (in German) (98th ed.) (published November 1936). 98 (11–12): 714–732. Bibcode:1936ZPhy...98..714H. doi:10.1007/BF01343663. ISSN 1434-6001. S2CID 120354480. Wikidata Q28794438. English translation
  3. Mark Buchanan (2006). "Thesis: Past the Schwinger limit". Nature Physics (2nd ed.) (published November 2006). 2 (11): 721. Bibcode:2006NatPh...2..721B. doi:10.1038/nphys448. ISSN 1745-2473. S2CID 119831515. Wikidata Q63918589.
  4. 1 2 J. Schwinger (1951). "On Gauge Invariance and Vacuum Polarization". Phys. Rev. (82nd ed.) (published June 1951). 82 (5): 664–679. Bibcode:1951PhRv...82..664S. doi:10.1103/PhysRev.82.664. ISSN 0031-899X. Wikidata Q21709192.
  5. Stepan S Bulanov; Timur Esirkepov; Alexander G. Thomas; James K Koga; Sergei V Bulanov (2010). "On the Schwinger limit attainability with extreme power lasers". Phys. Rev. Lett. (105th ed.) (published 24 November 2010). 105 (22): 220407. arXiv:1007.4306. doi:10.1103/PhysRevLett.105.220407. ISSN 0031-9007. PMID 21231373. S2CID 36857911. Wikidata Q27447776.
  6. C. Bula; K. T. McDonald; E. J. Prebys; et al. (1996). "Observation of Nonlinear Effects in Compton Scattering". Phys. Rev. Lett. (76th ed.) (published 22 April 1996). 76 (17): 3116–3119. Bibcode:1996PhRvL..76.3116B. doi:10.1103/PhysRevLett.76.3116. ISSN 0031-9007. PMID 10060879. Wikidata Q27450530.
  7. C. Bamber; S. J. Boege; T. Koffas; et al. (1999). "Studies of nonlinear QED in collisions of 46.6 GeV electrons with intense laser pulses". Phys. Rev. D (60th ed.) (published 8 October 1999). 60 (9): 092004. Bibcode:1999PhRvD..60i2004B. doi:10.1103/PhysRevD.60.092004. ISSN 1550-7998. Wikidata Q27441586.
  8. G. ZAVATTINI; U. GASTALDI; R. PENGO; G. RUOSO; F. DELLA VALLE; E. MILOTTI (20 June 2012). "Measuring the magnetic birefringence of vacuum: the PVLAS experiment". International Journal of Modern Physics A. 27 (15): 1260017. arXiv:1201.2309. doi:10.1142/S0217751X12600172. ISSN 0217-751X. Wikidata Q62555414.
  9. David d'Enterria; Gustavo G da Silveira (2013). "Observing Light-by-Light Scattering at the Large Hadron Collider". Phys. Rev. Lett. (111th ed.) (published 22 August 2013). 111 (8): 080405. arXiv:1305.7142. Bibcode:2013PhRvL.111h0405D. doi:10.1103/PhysRevLett.111.080405. ISSN 0031-9007. PMID 24010419. S2CID 43797550. Wikidata Q85643997.
  10. ATLAS Collaboration (17 March 2019). "ATLAS observes light scattering off light".
  11. G. Aad; et al. (31 July 2019). "Observation of Light-by-Light Scattering in Ultraperipheral Pb+Pb Collisions with the ATLAS Detector". Physical Review Letters. 123 (5): 052001. arXiv:1904.03536. Bibcode:2019PhRvL.123e2001A. doi:10.1103/PhysRevLett.123.052001. PMID 31491300. S2CID 260811101.
  12. Heinzl, T. (2012). "Strong-Field QED and High Power Lasers" (PDF). International Journal of Modern Physics A. 27 (15). arXiv:1111.5192. Bibcode:2012IJMPA..2760010H. doi:10.1142/S0217751X1260010X. S2CID 119198507.
  13. Gagik Yu Kryuchkyan; Karen Z. Hatsagortsyan (2011). "Bragg Scattering of Light in Vacuum Structured by Strong Periodic Fields". Phys. Rev. Lett. (107th ed.) (published 27 July 2011). 107 (5): 053604. arXiv:1102.4013. Bibcode:2011PhRvL.107e3604K. doi:10.1103/PhysRevLett.107.053604. ISSN 0031-9007. PMID 21867070. S2CID 25991919. Wikidata Q27347258.
  14. Berboucha, Meriame. "This Laser Could Rip Apart Empty Space". Forbes. Retrieved 2021-02-18.
  15. I. O'Neill (2011). "A Laser to Give the Universe a Hernia?". Discovery News. Archived from the original on November 3, 2011.
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