# Coleman–Mandula theorem

Coleman–Mandula theorem The Coleman–Mandula theorem (named after Sidney Coleman and Jeffrey Mandula)[1] is a no-go theorem in theoretical physics. It states that "space-time and internal symmetries cannot be combined in any but a trivial way".[2] Since "realistic" theories contain a mass gap, the only conserved quantities, apart from the generators of the Poincaré group, must be Lorentz scalars.

Contents 1 Description 2 Limitations 2.1 Different spacetime symmetries 2.2 Spontaneous symmetry breaking 2.3 Discreteness 2.4 Supersymmetry 3 Generalization for higher spin symmetry 4 Notes Description Every quantum field theory satisfying the assumptions, Below any mass M, there are only finite number of particle types Any two-particle state undergoes some reaction at almost all energies The amplitude for elastic two body scattering are analytic functions of scattering angle at almost all energies,[3] and that has non-trivial interactions can only have a Lie group symmetry which is always a direct product of the Poincaré group and an internal group if there is a mass gap: no mixing between these two is possible. As the authors say in the introduction to the 1967 publication, "We prove a new theorem on the impossibility of combining space-time and internal symmetries in any but a trivial way."[4][1] Limitations Different spacetime symmetries The first condition for the theorem is that the unified group "G contains a subgroup locally isomorphic to the Poincare group." Therefore, the theorem only makes a statement about the unification of the Poincare group with an internal symmetry group. However, if the Poincare group is replaced with a different spacetime symmetry, for example, with the de Sitter group the theorem no longer holds, an infinite number of massless bosonic Higher Spin fields is required to exist however[5] In addition, if all particles are massless the Coleman–Mandula theorem allows a combination of internal and spacetime symmetries, because the spacetime symmetry group is then the conformal group.[6] Spontaneous symmetry breaking Note that this theorem only constrains the symmetries of the S-matrix itself. As such, it places no constraints on spontaneously broken symmetries which do not show up directly on the S-matrix level. In fact, it is easy to construct spontaneously broken symmetries (in interacting theories) which unify spatial and internal symmetries.[7][8] Discreteness This theorem also only applies to discrete Lie algebras and not continuous Lie groups. As such, it does not apply to discrete symmetries or globally for Lie groups. As an example of the latter, we might have a model where a rotation by τ (a discrete spacetime symmetry) is an involutive internal symmetry which commutes with all the other internal symmetries.

If there is no mass gap, it could be a tensor product of the conformal algebra with an internal Lie algebra. But in the absence of a mass gap, there are also other possibilities. For example, quantum electrodynamics has vector and tensor conserved charges. See infraparticle for more details.

Supersymmetry Supersymmetry may be considered a possible "loophole" of the theorem because it contains additional generators (supercharges) that are not scalars but rather spinors. This loophole is possible because supersymmetry is a Lie superalgebra, not a Lie algebra. The corresponding theorem for supersymmetric theories with a mass gap is the Haag–Łopuszański–Sohnius theorem.

Quantum group symmetry, present in some two-dimensional integrable quantum field theories like the sine-Gordon model, exploits a similar loophole.

Generalization for higher spin symmetry It was proven that conformal theories with higher-spin symmetry are not compatible with interactions.[9] Notes ^ Jump up to: a b Coleman, Sidney; Mandula, Jeffrey (1967). "All Possible Symmetries of the S Matrix". Physical Review. 159 (5): 1251. Bibcode:1967PhRv..159.1251C. doi:10.1103/PhysRev.159.1251. ^ Pelc, Oskar; Horwitz, L. P. (1997). "Generalization of the Coleman–Mandula theorem to higher dimension". Journal of Mathematical Physics. 38 (1): 139–172. arXiv:hep-th/9605147. Bibcode:1997JMP....38..139P. doi:10.1063/1.531846. S2CID 14989550.; Jeffrey E. Mandula (2015). "Coleman-Mandula theorem" Scholarpedia 10(2):7476. doi:10.4249/scholarpedia.7476 ^ Weinberg, Steven (2000). The Quantum Theory of fields Volume III. Cambridge University Press. ISBN 9780521769365. ^ "Valuing Negativity | Cosmic Variance". Archived from the original on 2006-06-21. Retrieved 2006-06-24. ^ Angelos Fotopoulos, Mirian Tsulaia (2010). "On the tensionless limit of string theory, off-shell higher spin interaction vertices and BCFW recursion relations". Journal of High Energy Physics. 2010 (11). CiteSeerX 10.1.1.764.4381. doi:10.1007/JHEP11(2010)086. S2CID 119287675. ^ Weinberg, Steven (2000). The Quantum Theory of fields Volume III. Cambridge University Press. ISBN 9780521769365. ^ Fabrizio Nesti, Roberto Percacci (2008). "Gravi-Weak Unification". Journal of Physics A: Mathematical and Theoretical. 41 (7): 075405. arXiv:0706.3307. doi:10.1088/1751-8113/41/7/075405. S2CID 15045658. ^ Noboru Nakanishi. "New Local Supersymmetry In The Framework Of Einstein Gravity". ^ Vasyl Alba, Kenan Diab (2016). "Constraining conformal field theories with a higher spin symmetry in d> 3 dimensions". Journal of High Energy Physics. 2016 (3). arXiv:1510.02535. doi:10.1007/JHEP03(2016)044. S2CID 119639307. This quantum mechanics-related article is a stub. You can help Wikipedia by expanding it.

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