Symmetry of stationary hypersurfaces in hyperbolic space
نویسنده
چکیده
We deposit a prescribed amount of liquid on an umbilical hypersurface of the hyperbolic space Hn+1. Under the presence of a uniform gravity vector field directed towards , we seek the shape of such a liquid drop in a state of equilibrium of the mechanical system. The liquid-air interface is then modeled by a hypersurface under the condition that its mean curvature is a function of the distance from , together with the fact that the angle that makes with along its boundary is constant. We show that the hypersurface is rotational symmetric with respect to a geodesic orthogonal to . We extend this result to other configurations, for example, liquid bridges trapped between two umbilical hypersurfaces. Finally, we obtain a result which says that, under some assumptions on the mean curvature, an embedded hypersurface inherits a certain symmetry from its boundary. Mathematics Subject Classifications. 53A10, 35Q35, 76B45, 35J65.
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تاریخ انتشار 2006