nLab evolutionary derivative

Redirected from "evolutionary derivative of field-dependent section".

Contents

Context

Variational calculus

Idea
Definition
Examples
Properties
References

Idea

The evolutionary derivative or “Fréchet derivative of a tuple of differential functions” (Olver 93, def. 5.24)) is the derivative of a section of some vector bundle $V$ depending on jets of a “field bundle” $E$ (def. below) along the prolongation of an evolutionary vector field on $E$ . Equivalently this is a jet-dependent differential operator on the vertical tangent bundle of $E$ and as such is usefully related to the Euler-Lagrange derivative on $E$ (example and prop. below).

Definition

In the following fiber bundles are considered in differential geometry and in particular vector bundle means smooth vector bundle.

Definition

(field-dependent sections)

For

E \overset{fb}{\longrightarrow} \Sigma

a fiber bundle, regarded as a field bundle, and for

E' \overset{fb'}{\longrightarrow} \Sigma

any other fiber bundle over the same base space (spacetime), we write

\Gamma_{J^\infty_\Sigma(E)}(E') \;\coloneqq\; \Gamma_{J^\infty_\Sigma(E)}( jb^\ast E' ) \;=\; Hom_\Sigma(J^\infty_\Sigma(E), E') \;\simeq\; DiffOp(E,E')

for the space of sections of the pullback of bundles of $E'$ to the jet bundle $J^\infty_\Sigma(E) \overset{jb}{\longrightarrow} \Sigma$ along $jb$ .

\Gamma_{J^\infty_\Sigma(E)}(E') \;=\; \left\{ \array{ && E' \\ & {}^{\mathllap{}}\nearrow & \downarrow \mathrlap{fb'} \\ J^\infty_\Sigma(E) &\underset{jb}{\longrightarrow}& \Sigma } \phantom{A}\,\, \right\} \,.

(Equivalently this is the space of differential operators from sections of $E$ to sections of $E'$ . )

In (Olver 93, section 5.1, p. 288) the field dependent sections of def. , considered in local coordinates, are referred to as tuples of differential functions.

Example

(source forms and evolutionary vector fields are field-dependent sections)

For $E \overset{fb}{\to} \Sigma$ a field bundle, write $T_\Sigma E$ for its vertical tangent bundle and $T_\Sigma^\ast E$ for its dual vector bundle, the vertical cotangent bundle.

Then the field-dependent sections of these bundles according to def. are identified as follows:

the space $\Gamma_{J^\infty_\Sigma(E)}(T_\Sigma E)$ contains the space of evolutionary vector fields $v$ as those bundle morphism which respect not just the projection to $\Sigma$ but also its factorization through $E$ :

$\left( \array{ && T_\Sigma E \\ & {}^{\mathllap{v}}\nearrow & \downarrow^{\mathrlap{tb_\Sigma}} \\ J^\infty_\Sigma(E) &\underset{jb_{\infty,0}}{\longrightarrow}& E & \overset{fb}{\longrightarrow}& \Sigma } \right) \;\in\; \Gamma_{J^\infty_\Sigma(E)}(T_\Sigma E)$
$\Gamma_{J^\infty_\Sigma(E)}( T^\ast_\Sigma E) \otimes \wedge^{p+1}_\Sigma(T^\ast \Sigma)$ contains the space of source forms $E$ as those bundle morphisms which respect not just the projection to $\Sigma$ but also its factorization through $E$ :

$\left( \array{ && T^\ast_\Sigma E \\ & {}^{E}\nearrow & \downarrow^{\mathrlap{ctb_\Sigma}} \\ J^\infty_\Sigma(E) &\underset{jb_{\infty,0}}{\longrightarrow}& E & \overset{fb}{\longrightarrow}& \Sigma } \right) \;\in\; \Gamma_{J^\infty_\Sigma(E)}(T^\ast_\Sigma E)$

This makes manifest the duality pairing between source forms and evolutionary vector fields

\array{ \Gamma_{J^\infty_\Sigma(E)}(T_\Sigma E) \otimes \Gamma_{J^\infty_\Sigma(E)}(T^\ast_\Sigma E) &\longrightarrow& C^\infty(J^\infty_\Sigma(E)) }

which in local coordinates is given by

(v^a \partial_{\phi^a} \,,\, \omega_a \delta \phi^a) \mapsto v^a \omega_a

for $v^a, \omega_a \in C^\infty(J^\infty_\Sigma(E))$ smooth functions on the jet bundle.

Definition

(evolutionary derivative of field-dependent section)

Let

E \overset{fb}{\to} \Sigma

be a fiber bundle regarded as a field bundle and let

V \overset{vb}{\to} \Sigma

be a vector bundle. Then for

P \in \Gamma_{J^\infty_\Sigma(E)}(V)

a field-dependent section of $E$ accoring to def. , its evolutionary derivative is the morphism

\array{ \Gamma_{J^\infty_\Sigma(E)}(T_\Sigma E) & \overset{ \mathrm{D}P }{\longrightarrow} & \Gamma_{J^\infty_\Sigma(E)}(V) \\ v &\mapsto& \hat v(P) }

which, under the identification of example , sense an evolutionary vector field $v$ to the derivative of $P$ along the prolongation tangent vector field $\hat v$ of $v$ .

In the case that $E$ and $V$ are trivial vector bundles over Minkowski spacetime with coordinates $((x^\mu), (\phi^a))$ and $((x^\mu), (\rho^b))$ , respectively, then this is given by

((\mathrm{D}P)(v))^b \;=\; \left( v^a \frac{\partial P^b}{\partial \phi^a} + \frac{d v^a}{d x^\mu} \frac{\partial P^b}{\partial \phi^a_{,\mu}} + \frac{d^2 v^a}{d x^\mu d x^\nu} \frac{\partial P^b}{\partial \phi^a_{,\mu \nu}} + \cdots \right)

This makes manifest that $\mathrm{D}P$ may equivalently be regarded as a $J^\infty_\Sigma(E)$ -dependent differential operator from the vertical tangent bundle $T_\Sigma E$ to $V$ , namely a morphism of the form

\mathrm{D}_P \;\colon\; J^\infty_\Sigma(E) \times_\Sigma J^\infty_\Sigma T_\Sigma E \longrightarrow V

in that

(1)

\mathrm{D}_P(-,v) = \mathrm{D}P(v) = \hat v (P) \,.

(Olver 93, def. 5.24)

Examples

Example

(evolutionary derivative of Lagrangian function)

Over a (pseudo-)Riemannian manifold $\Sigma$ , let $\mathbf{L} = L dvol \in \Omega^{p,0}_\Sigma(E)$ be a Lagrangian density, with coefficient function regarded as a field-dependent section (def. ) of the trivial real line bundle:

L \;\in \; \Gamma_{J^\infty_\Sigma}(E)(\Sigma \times \mathbb{R}) \,,

Then the formally adjoint differential operator

(\mathrm{D}_L)^\ast \;\colon\; J^\infty_\Sigma(E)\times_\Sigma (\Sigma \times \mathbb{R})^\ast \longrightarrow T_\Sigma^\ast E

of its evolutionary derivative, def. , regarded as a $J^\infty_\Sigma(E)$ -dependent differential operator $\mathrm{D}_P$ from $T_\Sigma$ to $V$ and applied to the constant section

1 \in \Gamma_\Sigma(\Sigma \times \mathbb{R}^\ast)

is the Euler-Lagrange derivative

\delta_{EL}\mathbf{L} \;=\; \left(\mathrm{D}_{L}\right)^\ast(1) \;\in\; \Gamma_{J^\infty_\Sigma(E)}(T_\Sigma^\ast) \simeq \Omega^{p+1,1}_\Sigma(E)_{source}

via the identification from example .

(Olver 93, above (5.80))

Properties

Proposition

(Euler-Lagrange derivative is derivation via evolutionary derivatives)

Let $V \overset{vb}{\to} \Sigma$ be a vector bundle and write $V^\ast \overset{}{\to} \Sigma$ for its dual vector bundle.

For field-dependent sections (def. )

\alpha \in \Gamma_{J^\infty_\Sigma(E)}(V)

and

\beta^\ast \in \Gamma_{J^\infty_\Sigma(E)}(V^\ast)

we have that the Euler-Lagrange derivative of their canonical pairing to a smooth function on the jet bundle is the sum of the derivative of either one via the formally adjoint differential operator of the evolutionary derivative (def. ) of the other:

\delta_{EL}( \alpha \cdot \beta^\ast ) \;=\; (\mathrm{D}_\alpha)^\ast(\beta^\ast) + (\mathrm{D}_{\beta^\ast})^\ast(\alpha)

(Olver 93 (5.80))

Proof

It is sufficient to check this in local coordinates. By the product law for differentiation we have

\begin{aligned} \frac{ \delta_{EL} \left(\alpha \cdot \beta^\ast \right) } { \delta \phi^a } & = \frac{\partial \left(\alpha \cdot \beta^\ast \right)}{\partial \phi^a} - \frac{d}{d x^\mu} \left( \frac{\partial \left( \alpha \cdot \beta^\ast \right)}{\partial \phi^a_{,\mu}} \right) + \frac{d}{d x^\mu d x^\nu} \left( \frac{\partial \left( \alpha \cdot \beta^\ast \right) }{\partial \phi^a_{,\mu \nu}} \right) - \cdots \\ & = \phantom{+} \frac{\partial \alpha }{\partial \phi^a} \cdot \beta^\ast - \frac{d}{d x^\mu} \left( \frac{\partial \alpha }{\partial \phi^a_{,\mu}} \cdot \beta^\ast \right) + \frac{d}{d x^\mu d x^\nu} \left( \frac{\partial \alpha }{\partial \phi^a_{,\mu \nu}} \cdot \beta^\ast \right) - \cdots \\ & \phantom{=} + \frac{\partial \beta^\ast }{\partial \phi^a} \cdot \alpha - \frac{d}{d x^\mu} \left( \frac{\partial \beta^\ast }{\partial \phi^a_{,\mu}} \cdot \alpha \right) + \frac{d}{d x^\mu d x^\nu} \left( \frac{\partial \beta^\ast }{\partial \phi^a_{,\mu \nu}} \cdot \alpha \right) - \cdots \\ & = (\mathrm{D}_\alpha)^\ast(\beta^\ast) + (\mathrm{D}_{\beta^\ast})^\ast(\alpha) \end{aligned}

Proposition

(evolutionary derivative of Euler-Lagrange forms is formally self-adjoint)

Let $(E,\mathbf{L})$ be a Lagrangian field theory over Minkowski spacetime and regard the Euler-Lagrange derivative

\delta_{EL}\mathbf{L} \;=\; \delta_{EL}L \wedge dvol_\Sigma

as a field-dependent section of the vertical cotangent bundle

\delta_{EL}L \;\in\; \Gamma_{J^\infty_\Sigma(E)}(T^\ast_\Sigma E)

as in example . Then the corresponding evolutionary derivative field-dependent differential operator $D_{\delta_{EL}L}$ (def. ) is formally self-adjoint:

(D_{\delta_{EL}L})^\ast \;=\; D_{\delta_{EL}L}

(Olver 93, theorem 5.92)

Proposition

(evolutionary derivative of Euler-Lagrange forms is formally self-adjoint)

Let $(E,\mathbf{L})$ be a Lagrangian field theory over Minkowski spacetime and regard the Euler-Lagrange derivative

\delta_{EL}\mathbf{L} \;=\; \delta_{EL}L \wedge dvol_\Sigma

as a field-dependent section of the vertical cotangent bundle

\delta_{EL}L \;\in\; \Gamma_{J^\infty_\Sigma(E)}(T^\ast_\Sigma E)

as in example . Then the corresponding evolutionary derivative field-dependent differential operator $D_{\delta_{EL}L}$ (def. ) is formally self-adjoint:

(D_{\delta_{EL}L})^\ast \;=\; D_{\delta_{EL}L}

(Olver 93, theorem 5.92) The following proof is due to Igor Khavkine.

Proof

By definition of the Euler-Lagrange form we have

\frac{\delta_{EL} L }{\delta \phi^a} \delta \phi^a \, \wedge dvol_\Sigma \;=\; \delta L \,\wedge dvol_\Sigma \;+\; d(...) \,.

Applying the variational derivative $\delta$ to both sides of this equation yields

\left(\delta \frac{\delta_{EL} L }{\delta \phi^a}\right) \wedge \delta \phi^a \, \wedge dvol_\Sigma \;=\; \underset{= 0}{\underbrace{\delta \delta L}} \wedge dvol_\Sigma \;+\; d(...) \,.

It follows that for $v,w$ any two evolutionary vector fields the contraction of their prolongations $\hat v$ and $\hat w$ into the differential 2-form on the left is

\left( \delta \frac{\delta_{EL} L }{\delta \phi^a} \wedge \delta \phi^a \right)(v,w) = w^a (\mathrm{D}_{\delta_{EL}})_a(v) - v^b(\mathrm{D}_{\delta_{EL}})_b(w) \,,

by inspection of the definition of the evolutionary derivative (def. ) and their contraction into the form on the right is

\iota_{\hat v} \iota_{\hat w} d(...) \;=\; d(...)

by the fact (prop. ) that contraction with prolongations of evolutionary vector fields coommutes with the total spacetime derivative.

Hence the last two equations combined give

w^a (\mathrm{D}_{\delta_{EL}})_a(v) - v^b(\mathrm{D}_{\delta_{EL}})_b(w) \;=\; d(...) \,.

This is the defining condition for $\mathrm{D}_{\delta_{EL}}$ to be formally self-adjoint differential operator.

References

Peter Olver, Applications of Lie groups to Differential equations, Graduate Texts in Mathematics, Springer 1993
Glenn Barnich, equation(3) of A note on gauge systems from the point of view of Lie algebroids, in P. Kielanowski, V. Buchstaber, A. Odzijewicz,

M.. Schlichenmaier, T Voronov, (eds.) XXIX Workshop on Geometric Methods in Physics, vol. 1307 of AIP Conference Proceedings, 1307, 7 (2010) (arXiv:1010.0899, doi:/10.1063/1.3527427)
Igor Khavkine, starting with p. 45 of Characteristics, Conal Geometry and Causality in Locally Covariant Field Theory (arXiv:1211.1914)

Last revised on December 5, 2017 at 23:07:40. See the history of this page for a list of all contributions to it.

nLab evolutionary derivative

Context

Variational calculus

Differential geometric version

Derived differential geometric version

Contents

Idea

Definition

Definition

Example

Definition

Examples

Example

Properties

Proposition

Proof

Proposition

Proposition

Proof

References