On the validity of the Euler-Lagrange system without growth assumptions

Abstract

The constrained minimisers of convex integral functionals of the form F(v)=∫ F(∇k v(x)) d x defined on Sobolev mappings v∈ Wk,1g( , RN ) K, where K is a closed convex subset of the Dirichlet class Wk,1g( , RN ), are characterised as the energy solutions to the Euler-Lagrange inequality for F. We assume that the essentially smooth integrand F RN k Rn R\+∞\ is convex, lower semi-continuous, proper and at least super-linear at infinity. In the unconstrained case K= Wk,1g( , RN ), if the integrand F is convex, real-valued, and satisfies a demi-coercivity condition, then ∫ \! F(∇k u) · ∇kφ \, d x =0 holds for all φ ∈ W0k( , RN), where ∇k u is the absolutely continuous part of the vector measure Dku.