We study some properties of graphs whose mean curvature (in distributional sense) is a vector Radon measure. In particular, we prove that the distributional mean cur- vature of the graph of a Lipschitz continuous function u is a measure if and only if the distributional divergence of T u is a measure. This equivalence fails to be true if Lipschitz continuity is relaxed, as it is shown in a couple of examples. Finally, we prove a theorem of approximation in W(1,1) and in the sense of mean curvature of C2 graphs by polyhedral graphs. A number of examples illustrating different situations which can occur complete the work.
On the generalized mean curvature
Barozzi, Elisabetta;
2010-01-01
Abstract
We study some properties of graphs whose mean curvature (in distributional sense) is a vector Radon measure. In particular, we prove that the distributional mean cur- vature of the graph of a Lipschitz continuous function u is a measure if and only if the distributional divergence of T u is a measure. This equivalence fails to be true if Lipschitz continuity is relaxed, as it is shown in a couple of examples. Finally, we prove a theorem of approximation in W(1,1) and in the sense of mean curvature of C2 graphs by polyhedral graphs. A number of examples illustrating different situations which can occur complete the work.File in questo prodotto:
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