A stability result for translating space-like graphs in Lorentz manifolds
Abstract
In this paper, we investigate space-like graphs defined over a domain ⊂ Mn in the Lorentz manifold Mn×R with the metric -ds2+σ, where Mn is a complete Riemannian n-manifold with the metric σ, has piecewise smooth boundary, and R denotes the Euclidean 1-space. We can prove an interesting stability result for translating space-like graphs in Mn×R under a conformal transformation.
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