Noether's second theorem

In mathematics and 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.

• Noether's first theorem
• Noether identities
• Gauge symmetry (mathematics)
• Emmy Noether

• Kosmann-Schwarzbach, Yvette (2010), The Noether theorems: Invariance and conservation laws in the twentieth century, Sources and Studies in the History of Mathematics and Physical Sciences, Springer-Verlag, ISBN 978-0-387-87867-6
• Olver, Peter (1993), Applications of Lie groups to differential equations, Graduate Texts in Mathematics, vol. 107 (2nd ed.), Springer-Verlag, ISBN 0-387-95000-1

• English translation of Noether's paper
• Fulp, R., Lada, T., Stasheff, J.. Noether variational theorem II and the BV formalism, arXiv: math/0204079
• Bashkirov, D., Giachetta, G., Mangiarotti, L., Sardanashvily, G., The KT-BRST complex of a degenerate Lagrangian system, Lett. Math. Phys. 83 (2008) 237; arXiv: math-ph/0702097.
• Emmy Noether; Tavel (1971). "Invariant Variation Problems". Transport Theory and Statistical Physics. 1 (3): 186–207. arXiv:physics/0503066. Bibcode:1971TTSP....1..186N. doi:10.1080/00411457108231446.