Convexity of the ideal boundary for complete open surfaces

Author:

Yim Jin-Whan

Abstract

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

American Mathematical Society (AMS)

Subject

Applied Mathematics,General Mathematics

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