### A stability result for $p$-harmonic systems with discontinuous coefficients.

Skip to main content (access key 's'),
Skip to navigation (access key 'n'),
Accessibility information (access key '0')

Back to Simple Search
# Advanced Search

We study very weak solutions of an A-harmonic equation to show that they are in fact the usual solutions.

We study an homogenization problem for Hamilton-Jacobi equations in the geometry of Carnot Groups. The tiling and the corresponding notion of periodicity are compatible with the dilatations of the Group and use the Lie bracket generating property.

We establish a local Lipschitz regularity result for local minimizers of asymptotically convex variational integrals.

**Page 1**