Kinoshita–Lee–Nauenberg theorem

(Redirected from KLN theorem)

The Kinoshita–Lee–Nauenberg theorem or KLN theorem states that perturbatively the standard model as a whole is infrared (IR) finite. That is, the infrared divergences coming from loop integrals are canceled by IR divergences coming from phase space integrals. It was introduced independently by Toichiro Kinoshita (1962) and Tsung-Dao Lee and Michael Nauenberg (1964).

An analogous result for quantum electrodynamics alone is known as Bloch–Nordsieck theorem.

Ultraviolet divergences in perturbative quantum field theory are dealt with in renormalization.

References

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  • Kinoshita, Toichiro (1962), "Mass Singularities of Feynman Amplitudes", Journal of Mathematical Physics, 3 (4): 650–677, Bibcode:1962JMP.....3..650K, doi:10.1063/1.1724268, ISSN 0022-2488
  • Lee, Tsung-Dao; Nauenberg, Michael (1964), "Degenerate Systems and Mass Singularities", Physical Review D, 133 (6B): B1549–B1562, Bibcode:1964PhRv..133.1549L, doi:10.1103/PhysRev.133.B1549
  • Bloch, Felix; Nordsieck, Arnold (1937), "Note on the Radiation Field of the Electron", Physical Review, 52 (2): 54–59, Bibcode:1937PhRv...52...54B, doi:10.1103/PhysRev.52.54
  • Taizo Muta, Foundations of Quantum Chromodynamics: An Introduction to Perturbative Methods in Gauge Theories, World Scientific Publishing Company; 3 edition (September 30, 2009)