In theoretical physics, a no-go theorem is a theorem that states that a particular situation is not physically possible. This type of theorem imposes boundaries on certain mathematical or physical possibilities via a proof of contradiction.[1][2][3]
Instances of no-go theorems edit
Full descriptions of the no-go theorems named below are given in other articles linked to their names. A few of them are broad, general categories under which several theorems fall. Other names are broad and general-sounding but only refer to a single theorem.
Classical electrodynamics edit
- Antidynamo theorems is a general category of theorems that restrict the type of magnetic fields that can be produced by dynamo action.
- Earnshaw's theorem states that a collection of point charges cannot be maintained in a stable stationary equilibrium configuration solely by the electrostatic interaction of the charges.
Non-relativistic quantum Mechanics and quantum information edit
- Bell's theorem[1]
- Kochen–Specker theorem[1]
- PBR theorem
- No-hiding theorem
- No-cloning theorem
- Quantum no-deleting theorem
- No-teleportation theorem
- No-broadcast theorem
- The no-communication theorem in quantum information theory gives conditions under which instantaneous transfer of information between two observers is impossible.
- No-programming theorem[4]
Quantum field theory and string theory edit
- Weinberg–Witten theorem states that massless particles (either composite or elementary) with spin cannot carry a Lorentz-covariant current, while massless particles with spin cannot carry a Lorentz-covariant stress-energy. It is usually interpreted to mean that the graviton ( ) in a relativistic quantum field theory cannot be a composite particle.
- Nielsen–Ninomiya theorem limits when it is possible to formulate a chiral lattice theory for fermions.
- Haag's theorem states that the interaction picture does not exist in an interacting, relativistic, quantum field theory (QFT).[5][1]
- Hegerfeldt's theorem implies that localizable free particles are incompatible with causality in relativistic quantum theory.[1]
- Coleman–Mandula theorem states that "space-time and internal symmetries cannot be combined in any but a trivial way".
- Haag–Łopuszański–Sohnius theorem is a generalisation of the Coleman–Mandula theorem.
- Goddard–Thorn theorem
- Maldacena–Nunez no-go theorem: any compactification of type IIB string theory on an internal compact space with no brane sources will necessarily have a trivial warp factor and trivial fluxes.[6]
- Reeh–Schlieder theorem[1]
Proof of impossibility edit
In mathematics there is the concept of proof of impossibility referring to problems impossible to solve. The difference between this impossibility and that of the no-go theorems is that a proof of impossibility states a category of logical proposition that may never be true; a no-go theorem instead presents a sequence of events that may never occur.
See also edit
References edit
- ^ a b c d e f Andrea Oldofredi (2018). "No-Go Theorems and the Foundations of Quantum Physics". Journal for General Philosophy of Science. 49 (3): 355–370. arXiv:1904.10991. doi:10.48550/arXiv.1904.10991.
- ^ Federico Laudisa (2014). "Against the No-Go Philosophy of Quantum Mechanics". European Journal for Philosophy of Science. 4 (1): 1–17. arXiv:1307.3179. doi:10.48550/arXiv.1307.3179.
- ^ Radin Dardashti (2021-02-21). "No-go theorems: What are they good for?". Studies in History and Philosophy of Science. 4 (1): 1–17. doi:10.1016/j.shpsa.2021.01.005.
- ^ Nielsen, M.A.; Chuang, Isaac L. (1997-07-14). "Programmable quantum gate arrays". Physical Review Letters. 79 (2): 321–324. arXiv:quant-ph/9703032. Bibcode:1997PhRvL..79..321N. doi:10.1103/PhysRevLett.79.321. S2CID 119447939.
- ^ Haag, Rudolf (1955). "On quantum field theories" (PDF). Matematisk-fysiske Meddelelser. 29: 12.
- ^ Becker, K.; Becker, M.; Schwarz, J.H. (2007). "10". String Theory and M-Theory. Cambridge: Cambridge University Press. pp. 480–482. ISBN 978-0521860697.
External links edit
Quotations related to No-go theorem at Wikiquote- Beating no-go theorems by engineering defects in quantum spin models (2014)
