Nonsmooth Convex Functionals and Feeble Viscosity Solutions of singular Euler-Lagrange Equations
Abstract
Let F be nonnegative, convex and smooth off a compact set K. We prove that continuous local minimisers of convex functionals are "very weak" viscosity solutions in the sense of Juutinen-Lindqvist of the highly singular Euler-Lagrange PDE expanded. The hypotheses on F do not guarrantee existence of minimising weak solutions and include the singular p-Laplacian for 1<p<2. A much deeper converse is also true, if K={0} and extra natural assumptions are satisfied. Our main advance is that we introduce systematic "flat" sup-convolution regularisations which apply to general singular nonlinear PDEs in order to cancel the strong singularity of F. As an application we extend a classical theorem of Calculus of Variations regarding existence for the Dirichlet problem. These results extends previous work of Julin-Juutinen and Juutinen-Lindqvist-Manfredi.
Keywords
Cite
@article{arxiv.1308.5918,
title = {Nonsmooth Convex Functionals and Feeble Viscosity Solutions of singular Euler-Lagrange Equations},
author = {Nikos Katzourakis},
journal= {arXiv preprint arXiv:1308.5918},
year = {2014}
}
Comments
24 pages, revised, CVPDE