Diffeomorphism Finiteness for Manifolds with Ricci Curvature and Ln/2-norm of Curvature Bounded.
Geometric and functional analysis (1991)
- Volume: 1, Issue: 3, page 231-252
- ISSN: 1016-443X; 1420-8970/e
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topAnderson, M.T., and Cheeger, J.. "Diffeomorphism Finiteness for Manifolds with Ricci Curvature and Ln/2-norm of Curvature Bounded.." Geometric and functional analysis 1.3 (1991): 231-252. <http://eudml.org/doc/58122>.
@article{Anderson1991,
author = {Anderson, M.T., Cheeger, J.},
journal = {Geometric and functional analysis},
keywords = {Gromov-Hausdorff distance; orbifold; degeneration of the metric},
number = {3},
pages = {231-252},
title = {Diffeomorphism Finiteness for Manifolds with Ricci Curvature and Ln/2-norm of Curvature Bounded.},
url = {http://eudml.org/doc/58122},
volume = {1},
year = {1991},
}
TY - JOUR
AU - Anderson, M.T.
AU - Cheeger, J.
TI - Diffeomorphism Finiteness for Manifolds with Ricci Curvature and Ln/2-norm of Curvature Bounded.
JO - Geometric and functional analysis
PY - 1991
VL - 1
IS - 3
SP - 231
EP - 252
KW - Gromov-Hausdorff distance; orbifold; degeneration of the metric
UR - http://eudml.org/doc/58122
ER -
Citations in EuDML Documents
top- Thomas Richard, Suites de flots de Ricci en dimension 3 et applications
- Paweł G. Walczak, A finiteness theorem for Riemannian submersions
- Deane Yang, Convergence of riemannian manifolds with integral bounds on curvature. II
- Deane Yang, Convergence of riemannian manifolds with integral bounds on curvature. I
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