Yuxin Ge, Guofang Wang, Jie Wu
Published 2012-11-15, updated 2013-04-29Version 2
In this paper we introduce a mass for asymptotically flat manifolds by using the Gauss-Bonnet curvature. We first prove that the mass is well-defined and is a geometric invariant, if the Gauss-Bonnet curvature is integrable and the decay order $\tau$ satisfies $\tau > \frac {n-4}{3}.$ Then we show a positive mass theorem for asymptotically flat graphs over ${\mathbb R}^n$. Moreover we obtain also Penrose type inequalities in this case.
Comments: 32 pages. arXiv:1211.7305 was integrated into this new version as an application
Unique isoperimetric foliations of asymptotically flat manifolds in all dimensions
Penrose type inequalities for asymptotically hyperbolic graphs
The Gauss-Bonnet-Chern Center of Mass for Asymptotically Flat Manifolds
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