Definition of Euler-Lagrange equation and properties, where can I find?

Question

I'm studying a paper and in the introduction appears the following: It is well known that existence of critical points and solvability of Euler-Lagrange equations are related, and there is and extensive literature about critical points which are minimizers, specially for functionals defined on the Sobolev space $W_{0}^{1,p}(\Omega),\; p>1,$ by $$J(u)=\int_{\Omega}\mathcal{F}(x,u,Du) dx,$$ where $\Omega$ is bounded, open subset of $\mathbb{R}^N.$

DOUBT: However, I'm struggling to find this extensive literature, and I also would like to find definition and properties of Euler-Lagrange equations.

Thanks in advance. I appreciate any help.

Answer 1

These lecture notes by Piotr Hajłasz might have the introductory level you are looking for:

The lectures will be divided into two almost independent streams. One of them is the theory of Sobolev spaces with numerous aspects which go far beyond the calculus of variations. The second stream is just calculus of variations. The theory of Sobolev spaces is a basic technical tool for the calculus of variations, however it suffices to know only basic results for most of the applications in that context.