ON COMPLETE OPEN MANIFOLDS WITH NON-NEGATIVE CURVATURE ALONG RAY DIRECTIONS

The authors study complete open manifolds whose curvature is non-negative along ray directions. They prove that such manifold has infinite volume. Cheeger-Gromoll's splitting theorem is generalized. They also study topology of such manifolds.

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Bibliographic Details
Published in	Acta mathematica scientia Vol. 18; no. 2; pp. 197 - 202
Main Author	徐森林梅加强
Format	Journal Article
Language	English
Published	Elsevier Ltd 01.04.1998
Subjects	Busemann function Busemanu convex convex function end exhaustion exhaustion function function Subharmonic Subharmonic function convex function Subharmonic function end exhaustion function Busemann function
Online Access	Get full text
ISSN	0252-9602 1572-9087
DOI	10.1016/S0252-9602(17)30753-1

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Summary:	The authors study complete open manifolds whose curvature is non-negative along ray directions. They prove that such manifold has infinite volume. Cheeger-Gromoll's splitting theorem is generalized. They also study topology of such manifolds.
Bibliography:	Xu Senlin; Mei Jiaqiang (Dept. of the Math., Univ. of Sci. & Tech. of China, Hefei 250026, China) 42-1227/O
ISSN:	0252-9602 1572-9087
DOI:	10.1016/S0252-9602(17)30753-1