The Euler–Lagrange equation was developed in the 1750s by Euler and Lagrange in connection with their studies of the tautochrone problem. This is the problem of determining a curve on which a weighted particle will fall to a fixed point in a fixed amount of time, independent of the starting point.

Lagrange solved this problem in 1755 and sent the solution to Euler. Both further developed Lagrange's method and applied it to mechanics, which led to the formulation of Lagrangian mechanics. Their correspondence ultimately led to the calculus of variations, a term coined by Euler himself in 1766.^[3]

Let ${\displaystyle (X,L)}$  be a real dynamical system with ${\displaystyle n}$  degrees of freedom. Here ${\displaystyle X}$  is the configuration space and ${\displaystyle L=L(t,{\boldsymbol {q}},{\boldsymbol {v}})}$  the Lagrangian, i.e. a smooth real-valued function such that ${\displaystyle {\boldsymbol {q}}\in X,}$  and ${\displaystyle {\boldsymbol {v}}}$  is an ${\displaystyle n}$ -dimensional "vector of speed". (For those familiar with differential geometry, ${\displaystyle X}$  is a smooth manifold, and ${\displaystyle L:{\mathbb {R} }_{t}\times TX\to {\mathbb {R} },}$  where ${\displaystyle TX}$  is the tangent bundle of ${\displaystyle X).}$ 

Let ${\displaystyle {\cal {P}}(a,b,{\boldsymbol {x}}_{a},{\boldsymbol {x}}_{b})}$  be the set of smooth paths ${\displaystyle {\boldsymbol {q}}:[a,b]\to X}$  for which ${\displaystyle {\boldsymbol {q}}(a)={\boldsymbol {x}}_{a}}$  and ${\displaystyle {\boldsymbol {q}}(b)={\boldsymbol {x}}_{b}.}$ 

The action functional ${\displaystyle S:{\cal {P}}(a,b,{\boldsymbol {x}}_{a},{\boldsymbol {x}}_{b})\to \mathbb {R} }$  is defined via

A path ${\displaystyle {\boldsymbol {q}}\in {\cal {P}}(a,b,{\boldsymbol {x}}_{a},{\boldsymbol {x}}_{b})}$  is a stationary point of ${\displaystyle S}$  if and only if

Here, ${\displaystyle {\dot {\boldsymbol {q}}}(t)}$  is the time derivative of ${\displaystyle {\boldsymbol {q}}(t).}$  When we say stationary point, we mean a stationary point of ${\displaystyle S}$  with respect to any small perturbation in ${\displaystyle {\boldsymbol {q}}}$ . See proofs below for more rigorous detail.

A standard example^{[citation needed]} is finding the real-valued function y(x) on the interval [a, b], such that y(a) = c and y(b) = d, for which the path length along the curve traced by y is as short as possible.

${\displaystyle {\text{s}}=\int _{a}^{b}{\sqrt {\mathrm {d} x^{2}+\mathrm {d} y^{2}}}=\int _{a}^{b}{\sqrt {1+y'^{2}}}\,\mathrm {d} x,}$ 

the integrand function being ${\textstyle L(x,y,y')={\sqrt {1+y'^{2}}}}$ .

The partial derivatives of L are:

${\displaystyle {\frac {\partial L(x,y,y')}{\partial y'}}={\frac {y'}{\sqrt {1+y'^{2}}}}\quad {\text{and}}\quad {\frac {\partial L(x,y,y')}{\partial y}}=0.}$ 

By substituting these into the Euler–Lagrange equation, we obtain

${\displaystyle {\begin{aligned}{\frac {\mathrm {d} }{\mathrm {d} x}}{\frac {y'(x)}{\sqrt {1+(y'(x))^{2}}}}&=0\\{\frac {y'(x)}{\sqrt {1+(y'(x))^{2}}}}&=C={\text{constant}}\\\Rightarrow y'(x)&={\frac {C}{\sqrt {1-C^{2}}}}=:A\\\Rightarrow y(x)&=Ax+B\end{aligned}}}$ 

that is, the function must have a constant first derivative, and thus its graph is a straight line.

Single function of single variable with higher derivatives edit

The stationary values of the functional

${\displaystyle I[f]=\int _{x_{0}}^{x_{1}}{\mathcal {L}}(x,f,f',f'',\dots ,f^{(k)})~\mathrm {d} x~;~~f':={\cfrac {\mathrm {d} f}{\mathrm {d} x}},~f'':={\cfrac {\mathrm {d} ^{2}f}{\mathrm {d} x^{2}}},~f^{(k)}:={\cfrac {\mathrm {d} ^{k}f}{\mathrm {d} x^{k}}}}$ 

can be obtained from the Euler–Lagrange equation^[5]

${\displaystyle {\cfrac {\partial {\mathcal {L}}}{\partial f}}-{\cfrac {\mathrm {d} }{\mathrm {d} x}}\left({\cfrac {\partial {\mathcal {L}}}{\partial f'}}\right)+{\cfrac {\mathrm {d} ^{2}}{\mathrm {d} x^{2}}}\left({\cfrac {\partial {\mathcal {L}}}{\partial f''}}\right)-\dots +(-1)^{k}{\cfrac {\mathrm {d} ^{k}}{\mathrm {d} x^{k}}}\left({\cfrac {\partial {\mathcal {L}}}{\partial f^{(k)}}}\right)=0}$ 

under fixed boundary conditions for the function itself as well as for the first ${\displaystyle k-1}$  derivatives (i.e. for all ${\displaystyle f^{(i)},i\in \{0,...,k-1\}}$ ). The endpoint values of the highest derivative ${\displaystyle f^{(k)}}$  remain flexible.

Several functions of single variable with single derivative edit

If the problem involves finding several functions (${\displaystyle f_{1},f_{2},\dots ,f_{m}}$ ) of a single independent variable (${\displaystyle x}$ ) that define an extremum of the functional

${\displaystyle I[f_{1},f_{2},\dots ,f_{m}]=\int _{x_{0}}^{x_{1}}{\mathcal {L}}(x,f_{1},f_{2},\dots ,f_{m},f_{1}',f_{2}',\dots ,f_{m}')~\mathrm {d} x~;~~f_{i}':={\cfrac {\mathrm {d} f_{i}}{\mathrm {d} x}}}$ 

then the corresponding Euler–Lagrange equations are^[6]

${\displaystyle {\begin{aligned}{\frac {\partial {\mathcal {L}}}{\partial f_{i}}}-{\frac {\mathrm {d} }{\mathrm {d} x}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{i}'}}\right)=0;\quad i=1,2,...,m\end{aligned}}}$ 

Single function of several variables with single derivative edit

A multi-dimensional generalization comes from considering a function on n variables. If ${\displaystyle \Omega }$  is some surface, then

${\displaystyle I[f]=\int _{\Omega }{\mathcal {L}}(x_{1},\dots ,x_{n},f,f_{1},\dots ,f_{n})\,\mathrm {d} \mathbf {x} \,\!~;~~f_{j}:={\cfrac {\partial f}{\partial x_{j}}}}$ 

is extremized only if f satisfies the partial differential equation

${\displaystyle {\frac {\partial {\mathcal {L}}}{\partial f}}-\sum _{j=1}^{n}{\frac {\partial }{\partial x_{j}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{j}}}\right)=0.}$ 

When n = 2 and functional ${\displaystyle {\mathcal {I}}}$  is the energy functional, this leads to the soap-film minimal surface problem.

Several functions of several variables with single derivative edit

If there are several unknown functions to be determined and several variables such that

${\displaystyle I[f_{1},f_{2},\dots ,f_{m}]=\int _{\Omega }{\mathcal {L}}(x_{1},\dots ,x_{n},f_{1},\dots ,f_{m},f_{1,1},\dots ,f_{1,n},\dots ,f_{m,1},\dots ,f_{m,n})\,\mathrm {d} \mathbf {x} \,\!~;~~f_{i,j}:={\cfrac {\partial f_{i}}{\partial x_{j}}}}$ 

the system of Euler–Lagrange equations is^[5]

${\displaystyle {\begin{aligned}{\frac {\partial {\mathcal {L}}}{\partial f_{1}}}-\sum _{j=1}^{n}{\frac {\partial }{\partial x_{j}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{1,j}}}\right)&=0_{1}\\{\frac {\partial {\mathcal {L}}}{\partial f_{2}}}-\sum _{j=1}^{n}{\frac {\partial }{\partial x_{j}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{2,j}}}\right)&=0_{2}\\\vdots \qquad \vdots \qquad &\quad \vdots \\{\frac {\partial {\mathcal {L}}}{\partial f_{m}}}-\sum _{j=1}^{n}{\frac {\partial }{\partial x_{j}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{m,j}}}\right)&=0_{m}.\end{aligned}}}$ 

Single function of two variables with higher derivatives edit

If there is a single unknown function f to be determined that is dependent on two variables x₁ and x₂ and if the functional depends on higher derivatives of f up to n-th order such that

${\displaystyle {\begin{aligned}I[f]&=\int _{\Omega }{\mathcal {L}}(x_{1},x_{2},f,f_{1},f_{2},f_{11},f_{12},f_{22},\dots ,f_{22\dots 2})\,\mathrm {d} \mathbf {x} \\&\qquad \quad f_{i}:={\cfrac {\partial f}{\partial x_{i}}}\;,\quad f_{ij}:={\cfrac {\partial ^{2}f}{\partial x_{i}\partial x_{j}}}\;,\;\;\dots \end{aligned}}}$ 

then the Euler–Lagrange equation is^[5]

${\displaystyle {\begin{aligned}{\frac {\partial {\mathcal {L}}}{\partial f}}&-{\frac {\partial }{\partial x_{1}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{1}}}\right)-{\frac {\partial }{\partial x_{2}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{2}}}\right)+{\frac {\partial ^{2}}{\partial x_{1}^{2}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{11}}}\right)+{\frac {\partial ^{2}}{\partial x_{1}\partial x_{2}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{12}}}\right)+{\frac {\partial ^{2}}{\partial x_{2}^{2}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{22}}}\right)\\&-\dots +(-1)^{n}{\frac {\partial ^{n}}{\partial x_{2}^{n}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{22\dots 2}}}\right)=0\end{aligned}}}$ 

which can be represented shortly as:

${\displaystyle {\frac {\partial {\mathcal {L}}}{\partial f}}+\sum _{j=1}^{n}\sum _{\mu _{1}\leq \ldots \leq \mu _{j}}(-1)^{j}{\frac {\partial ^{j}}{\partial x_{\mu _{1}}\dots \partial x_{\mu _{j}}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{\mu _{1}\dots \mu _{j}}}}\right)=0}$ 

wherein ${\displaystyle \mu _{1}\dots \mu _{j}}$  are indices that span the number of variables, that is, here they go from 1 to 2. Here summation over the ${\displaystyle \mu _{1}\dots \mu _{j}}$  indices is only over ${\displaystyle \mu _{1}\leq \mu _{2}\leq \ldots \leq \mu _{j}}$  in order to avoid counting the same partial derivative multiple times, for example ${\displaystyle f_{12}=f_{21}}$  appears only once in the previous equation.

Several functions of several variables with higher derivatives edit

If there are p unknown functions f_i to be determined that are dependent on m variables x₁ ... x_m and if the functional depends on higher derivatives of the f_i up to n-th order such that

${\displaystyle {\begin{aligned}I[f_{1},\ldots ,f_{p}]&=\int _{\Omega }{\mathcal {L}}(x_{1},\ldots ,x_{m};f_{1},\ldots ,f_{p};f_{1,1},\ldots ,f_{p,m};f_{1,11},\ldots ,f_{p,mm};\ldots ;f_{p,1\ldots 1},\ldots ,f_{p,m\ldots m})\,\mathrm {d} \mathbf {x} \\&\qquad \quad f_{i,\mu }:={\cfrac {\partial f_{i}}{\partial x_{\mu }}}\;,\quad f_{i,\mu _{1}\mu _{2}}:={\cfrac {\partial ^{2}f_{i}}{\partial x_{\mu _{1}}\partial x_{\mu _{2}}}}\;,\;\;\dots \end{aligned}}}$ 

where ${\displaystyle \mu _{1}\dots \mu _{j}}$  are indices that span the number of variables, that is they go from 1 to m. Then the Euler–Lagrange equation is

${\displaystyle {\frac {\partial {\mathcal {L}}}{\partial f_{i}}}+\sum _{j=1}^{n}\sum _{\mu _{1}\leq \ldots \leq \mu _{j}}(-1)^{j}{\frac {\partial ^{j}}{\partial x_{\mu _{1}}\dots \partial x_{\mu _{j}}}}\left({\frac {\partial {\mathcal {L}}}{\partial f_{i,\mu _{1}\dots \mu _{j}}}}\right)=0}$ 

where the summation over the ${\displaystyle \mu _{1}\dots \mu _{j}}$  is avoiding counting the same derivative ${\displaystyle f_{i,\mu _{1}\mu _{2}}=f_{i,\mu _{2}\mu _{1}}}$  several times, just as in the previous subsection. This can be expressed more compactly as

${\displaystyle \sum _{j=0}^{n}\sum _{\mu _{1}\leq \ldots \leq \mu _{j}}(-1)^{j}\partial _{\mu _{1}\ldots \mu _{j}}^{j}\left({\frac {\partial {\mathcal {L}}}{\partial f_{i,\mu _{1}\dots \mu _{j}}}}\right)=0}$ 

Let ${\displaystyle M}$  be a smooth manifold, and let ${\displaystyle C^{\infty }([a,b])}$  denote the space of smooth functions ${\displaystyle f\colon [a,b]\to M}$ . Then, for functionals ${\displaystyle S\colon C^{\infty }([a,b])\to \mathbb {R} }$  of the form

${\displaystyle S[f]=\int _{a}^{b}(L\circ {\dot {f}})(t)\,\mathrm {d} t}$ 

where ${\displaystyle L\colon TM\to \mathbb {R} }$  is the Lagrangian, the statement ${\displaystyle \mathrm {d} S_{f}=0}$  is equivalent to the statement that, for all ${\displaystyle t\in [a,b]}$ , each coordinate frame trivialization ${\displaystyle (x^{i},X^{i})}$  of a neighborhood of ${\displaystyle {\dot {f}}(t)}$  yields the following ${\displaystyle \dim M}$  equations:

${\displaystyle \forall i:{\frac {\mathrm {d} }{\mathrm {d} t}}{\frac {\partial L}{\partial X^{i}}}{\bigg |}_{{\dot {f}}(t)}={\frac {\partial L}{\partial x^{i}}}{\bigg |}_{{\dot {f}}(t)}.}$ 

Euler-Lagrange equations can also be written in a coordinate-free form as ^[7]

${\displaystyle {\mathcal {L}}_{\Delta }\theta _{L}=dL}$ 

where ${\displaystyle \theta _{L}}$  is the canonical momenta 1-form corresponding to the Lagrangian ${\displaystyle L}$  . The vector field generating time translations is denoted by ${\displaystyle \Delta }$  and the Lie derivative is denoted by ${\displaystyle {\mathcal {L}}}$ . One can use local charts ${\displaystyle (q^{\alpha },{\dot {q}}^{\alpha })}$  in which ${\displaystyle \theta _{L}={\frac {\partial L}{\partial {\dot {q}}^{\alpha }}}dq^{\alpha }}$  and ${\displaystyle \Delta :={\frac {d}{dt}}={\dot {q}}^{\alpha }{\frac {\partial }{\partial q^{\alpha }}}+{\ddot {q}}^{\alpha }{\frac {\partial }{\partial {\dot {q}}^{\alpha }}}}$  and use coordinate expressions for the Lie derivative to see equivalence with coordinate expressions of the Euler Lagrange equation. The coordinate free form is particularly suitable for geometrical interpretation of the Euler Lagrange equations.

• Lagrangian mechanics
• Hamiltonian mechanics
• Analytical mechanics
• Beltrami identity
• Functional derivative

• "Lagrange equations (in mechanics)", Encyclopedia of Mathematics, EMS Press, 2001 [1994]
• Weisstein, Eric W. "Euler-Lagrange Differential Equation". MathWorld.
• Calculus of Variations at PlanetMath.
• Gelfand, Izrail Moiseevich (1963). Calculus of Variations. Dover. ISBN 0-486-41448-5.
• Roubicek, T.: . Chap.17 in: . (Ed. M. Grinfeld) J. Wiley, Weinheim, 2014, ISBN 978-3-527-41188-7, pp. 551–588.