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Let $M$ and $N$ be $C^2$ manifolds. Let $L \colon M \times TN \to \mathbb{R}$ be twice differentiable. Define a functional $F \colon D \subset C^2 (M, N) \to \mathbb{R}$ as $$F(q) = \int_M L \left( x, q(x), {\bf D} q(x) \right) \, d^m x$$ where $D$ is the subset of $C^2 (M, N)$ for which this
integral converges.
Note that if $f \in D$ and $g \in C^2(M,N)$ and the set $\{ x \in M \mid f(x) \neq g(x) \}$ is compact, then $g \in D$ . We may impose a topology on $D$ as follows: Suppose that $f \in D$ , that $K \subset M$ is compact, and that $U_0 \subset C^2 (K,N)$ is open. Then we define an open set $U \subset D$ as the set of all functions $g \in D$ such that $f(x) = g(x)$ when $x \notin K$ and such that the restriction of $g$ to $K$ lies in $U_0$ .
It is not hard to show that the functional $F$ is continuous in this topology, and hence it makes sense to speak of local extrema of $F$ . Suppose that $q_0 \in C^2 (M,N)$ is a local extremum. Furthermore, suppose that $f \colon M \times [-1,+1] \to N$ is twice differentiable and $f(x,0) = q_0 (x)$ for all $x \in q_0$ and $f(x,y) = q_0 (x)$ for all $y \in [-1,+1]$ when $x$ does not lie in a certain compact subset $K \subset M$ .
Then, viewed as a map from $[-1,+1]$ to $D$ , $f$ will be continuous. Therefore, since $q_0$ is a local extremum of $F$ , $0$ wil be a local extremum of the function $y \mapsto F (f(\cdot,y))$ . Because the function $y \mapsto F (f(\cdot,y))$ is differentiable, it will be the case that $${d \over d\lambda} F (f(\cdot,\lambda)) \big|_{\lambda = 0} = 0$$
It can be shown (see the addendum to this entry) that this condition will be satisfied if and only if $q_0$ is a solution of the following differential equation: \begin{equation}\label{el} dL - d \, \left({\partial L \over \partial(dq)}\right) = 0. \end{equation}This differential equation is known as the Euler-Lagrange differential equation (or Euler-Lagrange condition).
The Euler-Lagrange equation can only be used to investigate local extrema which are smooth functions. To a certain extent, this limitation can be ameliorated -- one can study piecewise smooth functions by supplementing the Euler-Lagrange equation with auxiliary conditions at discontinuities and, in some cases, one can consider non-smooth solutions as weak solutions of the Euler-Lagrange equation.
In the special cases $d L = 0$ , the Euler-Lagrange equation can be replaced by the Beltrami identity.
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