Wild solutions to scalar Euler-Lagrange equations
Abstract
We study very weak solutions to scalar Euler-Lagrange equations associated with quadratic convex functionals. We investigate whether solutions are necessarily , which would make the theories by De Giorgi-Nash and Schauder applicable. We answer this question positively for a suitable class of functionals. This is an extension of Weyl's classical lemma for the Laplace equation to a wider class of equations under stronger regularity assumptions. Conversely, using convex integration, we show that outside this class of functionals, there exist solutions of locally infinite energy to scalar Euler-Lagrange equations. In addition, we prove an intermediate result which permits the regularity of a solution to be improved to under suitable assumptions on the functional and solution.
Cite
@article{arxiv.2303.07298,
title = {Wild solutions to scalar Euler-Lagrange equations},
author = {Carl Johan Peter Johansson},
journal= {arXiv preprint arXiv:2303.07298},
year = {2024}
}
Comments
25 pages, 1 figure