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|Title:||Ricci curvature and ends of Riemannian orbifolds||Authors:||Koh, L.-K.||Issue Date:||Jun-1998||Citation:||Koh, L.-K. (1998-06). Ricci curvature and ends of Riemannian orbifolds. Mathematika 45 (1) : 135-144. ScholarBank@NUS Repository.||Abstract:||We consider Riemannian orbifolds with Ricci curvature non-negative outside a compact set and prove that the number of ends is finite. We also show that if that compact set is small then the Riemannian orbifolds have only two ends. A version of splitting theorem for orbifolds also follows as an easy consequence.||Source Title:||Mathematika||URI:||http://scholarbank.nus.edu.sg/handle/10635/104058||ISSN:||00255793|
|Appears in Collections:||Staff Publications|
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