【摘 要】
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This is a report on my joint work with Vincent Bonini and Shiguang Ma.Using the so-called horospherical metrics for immersed hypersurfaces with certain conv
【机 构】
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UniversityofCaliforniaSantaCruz
【出 处】
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Workshop on Geometric Analysis 2016(2016几何分析研讨会)
论文部分内容阅读
This is a report on my joint work with Vincent Bonini and Shiguang Ma.Using the so-called horospherical metrics for immersed hypersurfaces with certain convexity in hyperbolic space, we present a proof for the conjecture (Alexander-Currier) that,except covering maps of equip-distance surfaces in hyperbolic 3-space, a complete, immersed, nonnegatively curved hypersurface in hyperbolic space is always embedded with at most two point boundary at infinity.
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