참고문헌
- Tohoku Math. J. v.49 Spacelike hypersurfaces of constantmean curvature and Calabi-Bernstein type problems Luis J. Alias;A. Romero;M. Sanchez
- General Relativety and Gravitation v.27 no.1 Uniqueness of complete spacelike hypersurfaces of constant mean curvature in Generalized Robertson-Walker sqacetimes
- WOGDA'94 Proceeding of III Fall's Workshop: Differential Geometry and its Applications Spacelike hypersurfaces of constant mean curvature in spatially closed Lorentzian manifolds
- Marcel Dekker Pure and Applied Mathematics v.67 Global Lorentzian Geometry J. Beem;P. Ehrlich
- Marcel Dekker Pure and Applied Mathematics Global Lorentzian Geometry Second Revised edition J. Beem;P.Ehrlich;K. Easley
- Manuscripta Math. v.31 Line integration of Ricci curvature and conjugate points in Lorentzian and Riemannian manifolds C. Chicone;P. Ehrlich
- Contemporary Math. Series v.170 From the Riccati inequality to the Raychaudhuri equation P. Ehrlich;S.-B. Kim
- preprint Some semi-Riemannian volume comparison theorems P. Ehrlich;M. Sanchez
- Math. Ann v.252 Jacobi tensors and Ricci curvature J.-H., Eschenburg;J. J. O'Sullivan
- Thesis, On the size of a rotating fiuid mass in general relativity T. T.Frankel
- J. of Diff. Geom v.14 A generalization of Myers theorem and an application to relativistic cosmology G. J. Galloway
- J. Korean Math. Soc. v.31 no.1 A focal Myers-Galloway theorem on space-time S.-B. Kim;D.-S. Kim
- Kyungpook Math. J. v.35 no.3 Jacobi Tensors and Focal Points for Spacelike Submanifolds S.-B. Kim;D.-S. Kim;?Y.-T. Jung
- Conformal Geometry Conformal transformations between Einstein spaces W. Kuhnel;R. Kulkarni U. Pinkal(Eds.)
- Duke Math. J. v.8 Riemannian manifolds with positive mean curvature S. B. Myers
- Semi-Riemannian Geometry with Applications to Relativity B. O'Neill