Physics:Noether's second theorem

From HandWiki
Short description: Physics theorem for symmetries of action

In mathematics and theoretical physics, Noether's second theorem relates symmetries of an action functional with a system of differential equations.[1] The action S of a physical system is an integral of a so-called Lagrangian function L, from which the system's behavior can be determined by the principle of least action.

Specifically, the theorem says that if the action has an infinite-dimensional Lie algebra of infinitesimal symmetries parameterized linearly by k arbitrary functions and their derivatives up to order m, then the functional derivatives of L satisfy a system of k differential equations.

Noether's second theorem is sometimes used in gauge theory. Gauge theories are the basic elements of all modern field theories of physics, such as the prevailing Standard Model.

The theorem is named after its discoverer, Emmy Noether.

See also

Notes

  1. Noether, Emmy (1918), "Invariante Variationsprobleme", Nachr. D. König. Gesellsch. D. Wiss. Zu Göttingen, Math-phys. Klasse 1918: 235–257, https://de.wikisource.org/wiki/Invariante_Variationsprobleme 
    Translated in Noether, Emmy (1971). "Invariant variation problems". Transport Theory and Statistical Physics 1 (3): 186–207. doi:10.1080/00411457108231446. Bibcode1971TTSP....1..186N. 

References

Further reading

  • Noether, Emmy (1971). "Invariant Variation Problems". Transport Theory and Statistical Physics 1 (3): 186–207. doi:10.1080/00411457108231446. Bibcode1971TTSP....1..186N. 
  • Fulp, Ron; Lada, Tom; Stasheff, Jim (2002). "Noether's variational theorem II and the BV formalism". arXiv:math/0204079.
  • Bashkirov, D.; Giachetta, G.; Mangiarotti, L.; Sardanashvily, G (2008). "The KT-BRST Complex of a Degenerate Lagrangian System". Letters in Mathematical Physics 83 (3): 237–252. doi:10.1007/s11005-008-0226-y. Bibcode2008LMaPh..83..237B. 
  • Montesinos, Merced; Gonzalez, Diego; Celada, Mariano; Diaz, Bogar (2017). "Reformulation of the symmetries of first-order general relativity". Classical and Quantum Gravity 34 (20): 205002. doi:10.1088/1361-6382/aa89f3. Bibcode2017CQGra..34t5002M. 
  • Montesinos, Merced; Gonzalez, Diego; Celada, Mariano (2018). "The gauge symmetries of first-order general relativity with matter fields". Classical and Quantum Gravity 35 (20): 205005. doi:10.1088/1361-6382/aae10d. Bibcode2018CQGra..35t5005M.