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Soliton solutions of the mean curvature flow and minimal hypersurfaces

Let (M,g) be an oriented Riemannian manifold of dimension at least 3 and X a vector field on M. We show that the Monge-Ampère differential system (M.A.S.) for X-pseudosoliton hypersurfaces on (M,g) is equivalent to the minimal hypersurface M.A.S. on (M,g') for some Riemannian metric g', if and only if X is the gradient of a function u, in which case g'=exp(-2u)g. Counterexamples to this equivalence for surfaces are also given.

preprint2011arXivOpen access
Norbert HungerbühlerThomas Mettler
math.APmath.DG
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Norbert HungerbühlerThomas Mettler

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