Noether's second theorem

Last updated March 11, 2024

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.

Mathematical formulation

First variation formula

Suppose that we have a dynamical system specified in terms of ${\textstyle m}$ independent variables ${\textstyle x=(x^{1},\dots ,x^{m})}$ , ${\textstyle n}$ dependent variables ${\textstyle u=(u^{1},\dots ,u^{n})}$ , and a Lagrangian function ${\textstyle L(x,u,u_{(1)}\dots ,u_{(r)})}$ of some finite order ${\textstyle r}$ . Here ${\textstyle u_{(k)}=(u_{i_{1}...i_{k}}^{\sigma })=(d_{i_{1}}\dots d_{i_{k}}u^{\sigma })}$ is the collection of all ${\textstyle k}$ th order partial derivatives of the dependent variables. As a general rule, latin indices ${\textstyle i,j,k,\dots }$ from the middle of the alphabet take the values ${\textstyle 1,\dots ,m}$ , greek indices take the values ${\textstyle 1,\dots ,n}$ , and the summation convention apply to them. Multiindex notation for the latin indices is also introduced as follows. A multiindex ${\textstyle I}$ of length ${\textstyle k}$ is an ordered list $I=(i_{1},\dots ,i_{k})$ of ${\textstyle k}$ ordinary indices. The length is denoted as ${\textstyle \left|I\right|=k}$ . The summation convention does not directly apply to multiindices since the summation over lengths needs to be displayed explicitly, e.g.

\sum _{|I|=0}^{r}f_{I}g^{I}=fg+f_{i}g^{i}+f_{ij}g^{ij}+\dots +f_{i_{1}...i_{r}}g^{i_{1}...i_{r}}.

The variation of the Lagrangian with respect to an arbitrary variation ${\textstyle \delta u^{\sigma }}$ of the independent variables is

\delta L={\frac {\partial L}{\partial u^{\sigma }}}\delta u^{\sigma }+{\frac {\partial L}{\partial u_{i}^{\sigma }}}\delta u_{i}^{\sigma }+\dots +{\frac {\partial L}{\partial u_{i_{1}...i_{r}}^{\sigma }}}\delta u_{i_{1}...i_{r}}^{\sigma }=\sum _{|I|=0}^{r}{\frac {\partial L}{\partial u_{I}^{\sigma }}}\delta u_{I}^{\sigma },

and applying the inverse product rule of differentiation we get

\delta L=E_{\sigma }\delta u^{\sigma }+d_{i}\left(\sum _{|I|=0}^{r-1}P_{\sigma }^{iI}\delta u_{I}^{\sigma }\right)

where

E_{\sigma }={\frac {\partial L}{\partial u^{\sigma }}}-d_{i}{\frac {\partial L}{\partial u_{i}^{\sigma }}}+\dots +(-1)^{r}d_{i_{1}}\dots d_{i_{r}}{\frac {\partial L}{\partial u_{i_{1}...i_{r}}^{\sigma }}}=\sum _{|I|=0}^{r}(-1)^{|I|}d_{I}{\frac {\partial L}{\partial u_{I}^{\sigma }}}

are the Euler-Lagrange expressions of the Lagrangian, and the coefficients ${\textstyle P_{\sigma }^{I}}$ (Lagrangian momenta) are given by

P_{\sigma }^{I}=\sum _{|J|=0}^{r-|I|}(-1)^{|J|}d_{J}{\frac {\partial L}{\partial u_{IJ}^{\sigma }}}

Variational symmetries

A variation ${\textstyle \delta u^{\sigma }=X^{\sigma }(x,u,u_{(1)},\dots )}$ is an infinitesimal symmetry of the Lagrangian ${\textstyle L}$ if ${\textstyle \delta L=0}$ under this variation. It is an infinitesimal quasi-symmetry if there is a current ${\textstyle K^{i}=K^{i}(x,u,\dots )}$ such that ${\textstyle \delta L=d_{i}K^{i}}$ .

It should be remarked that it is possible to extend infinitesimal (quasi-)symmetries by including variations with $\delta x^{i}\neq 0$ as well, i.e. the independent variables are also varied. However such symmetries can always be rewritten so that they act only on the dependent variables. Therefore, in the sequel we restrict to so-called vertical variations where $\delta x^{i}=0$ .

For Noether's second theorem, we consider those variational symmetries (called gauge symmetries ) which are parametrized linearly by a set of arbitrary functions and their derivatives. These variations have the generic form

\delta _{\lambda }u^{\sigma }=R_{a}^{\sigma }\lambda ^{a}+R_{a}^{\sigma ,i}\lambda _{i}^{a}+\dots +R_{a}^{\sigma ,i_{1}...i_{s}}\lambda _{i_{1}...i_{s}}^{a}=\sum _{|I|=0}^{s}R_{a}^{\sigma ,I}\lambda _{I}^{a},

where the coefficients $R_{a}^{\sigma ,I}$ can depend on the independent and dependent variables as well as the derivatives of the latter up to some finite order, the $\lambda ^{a}=\lambda ^{a}(x)$ are arbitrarily specifiable functions of the independent variables, and the latin indices $a,b,\dots$ take the values $1,\dots ,q$ , where $q$ is some positive integer. For these variations to be (exact, i.e. not quasi-) gauge symmetries of the Lagrangian, it is necessary that $\delta _{\lambda }L=0$ for all possible choices of the functions $\lambda ^{a}(x)$ . If the variations are quasi-symmetries, it is then necessary that the current also depends linearly and differentially on the arbitrary functions, i.e. then $\delta _{\lambda }L=d_{i}K_{\lambda }^{i}$ , where

K_{\lambda }^{i}=K_{a}^{i}\lambda ^{a}+K_{a}^{i,j}\lambda _{j}^{a}+K_{a}^{i,j_{1}j_{2}}\lambda _{j_{1}j_{2}}^{a}\dots

For simplicity, we will assume that all gauge symmetries are exact symmetries, but the general case is handled similarly.

Noether's second theorem

The statement of Noether's second theorem is that whenever given a Lagrangian ${\textstyle L}$ as above, which admits gauge symmetries $\delta _{\lambda }u^{\sigma }$ parametrized linearly by $q$ arbitrary functions and their derivatives, then there exist $q$ linear differential relations between the Euler-Lagrange equations of ${\textstyle L}$ .

Combining the first variation formula together with the fact that the variations ${\textstyle \delta _{\lambda }u^{\sigma }}$ are symmetries, we get

0=E_{\sigma }\delta _{\lambda }u^{\sigma }+d_{i}W_{\lambda }^{i},\quad W_{\lambda }^{i}=\sum _{|I|=0}^{r}P_{\sigma }^{iI}\delta _{\lambda }u^{\sigma },

where on the first term proportional to the Euler-Lagrange expressions, further integrations by parts can be performed as

E_{\sigma }\delta _{\lambda }u^{\sigma }=\sum _{|I|=0}^{s}E_{\sigma }R_{a}^{\sigma ,I}\lambda _{I}^{a}=Q_{a}\lambda ^{a}+d_{i}\left(\sum _{|I|=0}^{s-1}Q_{a}^{iI}\lambda _{I}^{a}\right),

where

Q_{a}^{I}=\sum _{|J|=0}^{s-|I|}(-1)^{|J|}d_{J}\left(E_{\sigma }R_{a}^{\sigma ,IJ}\right),

in particular for ${\textstyle |I|=0}$ ,

Q_{a}=E_{\sigma }R_{a}^{\sigma }-d_{i}\left(E_{\sigma }R_{a}^{\sigma ,i}\right)+\dots +(-1)^{s}d_{i_{1}}\dots d_{i_{s}}\left(E_{\sigma }R_{a}^{\sigma ,i_{1}...i_{s}}\right)=\sum _{|I|=0}^{s}(-1)^{|I|}d_{I}\left(E_{\sigma }R_{a}^{\sigma ,I}\right).

Hence, we have an off-shell relation

0=Q_{a}\lambda ^{a}+d_{i}S_{\lambda }^{i},

where ${\textstyle S_{\lambda }^{i}=H_{\lambda }^{i}+W_{\lambda }^{i},}$ with ${\textstyle H_{\lambda }^{i}=\sum _{|I|=0}^{s-1}Q_{a}^{iI}\lambda _{I}^{a}}$ . This relation is valid for any choice of the gauge parameters ${\textstyle \lambda ^{a}(x)}$ . Choosing them to be be compactly supported, and integrating the relation over the manifold of independent variables, the integral total divergence terms vanishes due to Stokes' theorem. Then from the fundamental lemma of the calculus of variations, we obtain that $Q_{a}\equiv 0$ identically as off-shell relations (in fact, since the $Q_{a}$ are linear in the Euler-Lagrange expressions, they necessarily vanish on-shell). Inserting this back into the initial equation, we also obtain the off-shell conservation law $d_{i}S_{\lambda }^{i}=0$ . The expressions $Q_{a}$ are differential in the Euler-Lagrange expressions, specifically we have

Q_{a}={\mathcal {D}}_{a}[E]=\sum _{|I|=0}^{s}(-1)^{|I|}d_{I}\left(E_{\sigma }R_{a}^{\sigma ,I}\right)=\sum _{|I|=0}^{s}F_{a}^{\sigma ,I}d_{I}E_{\sigma },

where

F_{a}^{\sigma ,I}=\sum _{|J|=0}^{s-|I|}{\binom {|I|+|J|}{|I|}}(-1)^{|I|+|J|}d_{J}R_{a}^{\sigma ,IJ}.

Hence, the equations

0={\mathcal {D}}_{a}[E]

are ${\textstyle q}$ differential relations to which the Euler-Lagrange expressions are subject to, and therefore the Euler-Lagrange equations of the system are not independent.

Converse result

A converse of the second Noether them can also be established. Specifically, suppose that the Euler-Lagrange expressions $E_{\sigma }$ of the system are subject to $q$ differential relations

0={\mathcal {D}}_{a}[E]=\sum _{|I|=0}^{s}F_{a}^{\sigma ,I}d_{I}E_{\sigma }.

Letting ${\textstyle \lambda =(\lambda ^{1},\dots ,\lambda ^{q})}$ be an arbitrary ${\textstyle q}$ -tuple of functions, the formal adjoint of the operator ${\textstyle {\mathcal {D}}_{a}}$ acts on these functions through the formula

E_{\sigma }({\mathcal {D}}^{+})^{\sigma }[\lambda ]-\lambda ^{a}{\mathcal {D}}_{a}[E]=d_{i}B_{\lambda }^{i},

which defines the adjoint operator $({\mathcal {D}}^{+})^{\sigma }$ uniquely. The coefficients of the adjoint operator are obtained through integration by parts as before, specifically

({\mathcal {D}}^{+})^{\sigma }[\lambda ]=\sum _{|I|=0}^{s}R_{a}^{\sigma ,I}\lambda _{I}^{a},

where

R_{a}^{\sigma ,I}=\sum _{|J|=0}^{s-|I|}(-1)^{|I|+|J|}{\binom {|I|+|J|}{|I|}}d_{J}F_{a}^{\sigma ,IJ}.

Then the definition of the adjoint operator together with the relations $0={\mathcal {D}}_{a}[E]$ state that for each ${\textstyle q}$ -tuple of functions $\lambda$ , the value of the adjoint on the functions when contracted with the Euler-Lagrange expressions is a total divergence, viz. $E_{\sigma }({\mathcal {D}}^{+})^{\sigma }[\lambda ]=d_{i}B_{\lambda }^{i},$ therefore if we define the variations

\delta _{\lambda }u^{\sigma }:=({\mathcal {D}}^{+})^{\sigma }[\lambda ]=\sum _{|I|=0}^{s}R_{a}^{\sigma ,I}\lambda _{I}^{a},

the variation

\delta _{\lambda }L=E_{\sigma }\delta _{\lambda }u^{\sigma }+d_{i}W_{\lambda }^{i}=d_{i}\left(B_{\lambda }^{i}+W_{\lambda }^{i}\right)

of the Lagrangian is a total divergence, hence the variations ${\textstyle \delta _{\lambda }u^{\sigma }}$ are quasi-symmetries for every value of the functions $\lambda ^{a}$ .

Notes

↑ Noether, Emmy (1918), "Invariante Variationsprobleme", Nachr. D. König. Gesellsch. D. Wiss. Zu Göttingen, Math-phys. Klasse, 1918: 235–257
Translated in Noether, Emmy (1971). "Invariant variation problems". Transport Theory and Statistical Physics . 1 (3): 186–207. arXiv: physics/0503066 . Bibcode:1971TTSP....1..186N. doi:10.1080/00411457108231446. S2CID 119019843.

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References

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.
Sardanashvily, G. (2016). Noether's Theorems. Applications in Mechanics and Field Theory. Springer-Verlag. ISBN 978-94-6239-171-0.

Noether's second theorem

Contents

Mathematical formulation

First variation formula

Variational symmetries

Noether's second theorem

Converse result

See also

Notes

Related Research Articles

References

Further reading