Convexity of the Ideal Boundary for Complete Open Surfaces
For complete open surfaces admitting total curvature, we define several kinds of convexity for the ideal boundary, and provide examples of each of them. We also prove that a surface with most strongly convex ideal boundary is in fact a generalization of a Hadamard manifold in the sense that the ideal boundary consists entirely of Busemann functions.
- Publisher
- Amer Mathematical Soc
- Issue Date
- 1995
- Language
- English
- Article Type
- Article
- Keywords
NONNEGATIVE CURVATURE
- Citation
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, v.347, no.2, pp.687 - 700
- ISSN
- 0002-9947
- Appears in Collection
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