References
- Kodai. Math. J v.11 Semi-Kaehleran submanifolds of an indefinite complex space form R. Aiyama;H. Nakagawa;Y. J. Suh https://doi.org/10.2996/kmj/1138038931
- J. Differential Geometry v.3 Some characterizations of the space of symmetric tensors on a Riemannian manifold M. Berger;D. Ebin https://doi.org/10.4310/jdg/1214429060
- Einstein manifolds A. L. Besse
- Invent. Math. v.63 Les varietes de dimension 4 a signature non nulle don't la courbure et harmonique sont d'Einstein J. P. Bourguignon
- Rocky Mountain J. Math. v.31-2 On semi-symmetric complex hypersurfaces of a semi-definite complex space form Y. S. Choi;J.-H. Kwon;Y. J. Suh
- Rocky Mountain J. Math. v.31-3 On semi-Ryan complex submanifolds in an indefinite complex space form Y. S. Choi;J.-H. Kwon;Y. J. Suh
- Lecture Notes No. 838 Some remarks on the local structure of Codazzi tensors, in global differential geometry and global analysis A. Derdzinski
- Math. Ann. v.259 On compact Riemannian manifolds with harmonic curvature A. Derdzinski https://doi.org/10.1007/BF01457307
-
Comp. Math.
v.49
Self-dual K
$\"{a}$ hler manifolds and Einstein manifolds of codimension 4 A. Derdzinski - Tensor, N. S. v.31 On conformally symmetric manifolds with metrics of indices 0 and 1 A. Derdzinski;W. Roter
- London Math. Soc. v.47 Codazzi tensor field, curvature and Pontrjagin forms A. Derdzinski;C. L. Shen https://doi.org/10.1112/plms/s3-47.1.15
- Geom. Dedicata v.7 Einstein-like manifolds which are not Einstein A. Gray
- J. Korean Math. Soc. v.28 Hypersurfaces wilth harmonic Weyl tensor of a real space form U-Hang Ki;H. Nakagawa
- Foundations of differential geometry, Ⅰand Ⅱ S. Kobayashi;K. Nomizu
- Semi-Riemannian Geometry with applications to relativity B. O'Neill
- Proc. 13th bianual Seminar Canada Math. Congress v.2 A note on conformally flat spaces with constant scalar curvature P. J. Ryan
- Houston J. Math. v.28 On space-like hypersurfaces with constant mean curvature in a Lorentz manifold Y. J. Suh;Y. S. Choi;H. Y. Yang
- Math. Z. v.26 Reine infinitesimaly geometrie H. Weyl
- Zur infinitesimaly geometrie : Einordnung der prrojektiren und der Auffussung H. Weyl
- The theory of Lie derivatives and its applications K. Yano
- Integral Formulas in Riemannian Geometry K. Yano
- Ann. of Math. Studies v.32 Curvature and Betti numbers K. Yano;S. Bochner
- Series in Pure Math. Structures on manifolds K. Yano;M. Kon
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- Curvature properties of Robinson–Trautman metric vol.109, pp.2, 2018, https://doi.org/10.1007/s00022-018-0443-1