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A Haar-Rado type theorem for minimizers in Sobolev spaces
Published online by Cambridge University Press: 28 October 2010
Abstract
Let $u\in\phi+ W_0^{1,1}(\Omega)$ be a minimum for
$\[I(v)=\int_{\Omega}g(x,v(x))+f(\nabla v(x))\,{\rm d}x\]$
where f is convex, $v\mapsto g(x,v)$ is convex for a.e. x. We prove that u shares the same modulus of continuity of ϕ whenever Ω is sufficiently regular, the right derivative of g satisfies a suitable monotonicity assumption and the following inequality holds
$\forall \gamma\in\partial\Omega\qquad |u(x)-\phi(\gamma)|\le \omega(|x-\gamma|) \quad\text{a.e. }x\in\Omega.$
This result generalizes the classical Haar-Rado theorem for Lipschitz functions.
Keywords
- Type
- Research Article
- Information
- ESAIM: Control, Optimisation and Calculus of Variations , Volume 17 , Issue 4 , October 2011 , pp. 1133 - 1143
- Copyright
- © EDP Sciences, SMAI, 2010
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