A LOWER BOUND FOR THE RADIUS OF THE SMALLEST BALL CONTAINING A MANIFOLD WITH CURVATURE BOUNDED FROM ABOVE
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by Fernando Gim Enez
ftp://ftp.maths.tcd.ie/pub/EMIS/proceedings/6ICDGA/I/gimenez.ps
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Abstract:
Let F be a certain family of triples ('; N;M) where N and M are riemannian manifods and ' : N!M is an isometric immersion. We look for bounds for the
Citations
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| 1 | Immersions of positively curved manifolds into manifolds with curvature bounded above – Menninga - 1990 |
| 1 | On the radius of the smallst ball containing a compact manifold of positive curvature – Spruck - 1973 |
