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Noether's_second_theorem abstract "In mathematics and theoretical physics, Noether's second theorem relates symmetries of an action functional with a system of differential equations. 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_second_theorem wikiPageExternalLink 0503066.
Noether's_second_theorem wikiPageExternalLink 0702097.
Noether's_second_theorem wikiPageExternalLink 0204079.
Noether's_second_theorem wikiPageID "18021657".
Noether's_second_theorem wikiPageRevisionID "606716124".
Noether's_second_theorem hasPhotoCollection Noether's_second_theorem.
Noether's_second_theorem subject Category:Calculus_of_variations.
Noether's_second_theorem subject Category:Conservation_laws.
Noether's_second_theorem subject Category:Partial_differential_equations.
Noether's_second_theorem subject Category:Quantum_field_theory.
Noether's_second_theorem subject Category:Symmetry.
Noether's_second_theorem subject Category:Theorems_in_mathematical_physics.
Noether's_second_theorem subject Category:Theoretical_physics.
Noether's_second_theorem type Abstraction100002137.
Noether's_second_theorem type Collection107951464.
Noether's_second_theorem type Communication100033020.
Noether's_second_theorem type ConservationLaws.
Noether's_second_theorem type DifferentialEquation106670521.
Noether's_second_theorem type Equation106669864.
Noether's_second_theorem type Group100031264.
Noether's_second_theorem type Law108441203.
Noether's_second_theorem type MathematicalStatement106732169.
Noether's_second_theorem type Message106598915.
Noether's_second_theorem type PartialDifferentialEquation106670866.
Noether's_second_theorem type PartialDifferentialEquations.
Noether's_second_theorem type PhysicsTheorems.
Noether's_second_theorem type Proposition106750804.
Noether's_second_theorem type Statement106722453.
Noether's_second_theorem type Theorem106752293.
Noether's_second_theorem comment "In mathematics and theoretical physics, Noether's second theorem relates symmetries of an action functional with a system of differential equations. 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.".
Noether's_second_theorem label "Noether's second theorem".
Noether's_second_theorem label "Segundo teorema de Noether".
Noether's_second_theorem sameAs Segundo_teorema_de_Noether.
Noether's_second_theorem sameAs m.047rnjb.
Noether's_second_theorem sameAs Q10369454.
Noether's_second_theorem sameAs Q10369454.
Noether's_second_theorem sameAs Noether's_second_theorem.
Noether's_second_theorem wasDerivedFrom Noether's_second_theorem?oldid=606716124.
Noether's_second_theorem isPrimaryTopicOf Noether's_second_theorem.