journal article
Nov 01, 1992
Conformally homogeneous Lorentz manifolds. II
Topics
No keywords indexed for this article. Browse by subject →
References
7
[1]
M. N. Podoksënov, “A Lorentz manifold with a one-parameter group of homotheties which has a closed isotropic orbit,” Sibirsk. Mat. Zh.,30, No. 5, 135–137 (1989).
[2]
M. N. Podoksënov, “Pseudo-Riemannian manifolds with the essential group of conformal transformations,” submitted to VINITI on June 26, 1988, No. 4201-B89.
[3]
M. N. Podoksënov, “Lie groups with left-invariant connections and the groups of conformal transformations of pseudo-Riemannian manifolds,” Kandid. Dissert., Novosibirsk (1989).
[4]
D. V. Alekseevskiî, “Selfsimilar Lorentzian manifolds,” Ann. Global. Anal. Geom.,3, No. 1, 59–84 (1985).
10.1007/bf00054491
[5]
D. V. Alekseevskiî, “Groups of conformal transformations of Riemannian spaces,” Mat. Sb.,89, No. 2, 280–296 (1972).
[6]
L. Ph. Eisenhart, Riemannian Geometry [Russian translation], Izdat. Inostr. Lit., Moscow (1948).
[7]
Sh. Kobayashi and K. Homizu, Foundations of Differential Geometry. Part 1 [Russian translation], Nauka, Moscow (1981).
Metrics
6
Citations
7
References
Details
- Published
- Nov 01, 1992
- Vol/Issue
- 33(6)
- Pages
- 1087-1093
- License
- View
Authors
Cite This Article
M. N. Podoksenov (1992). Conformally homogeneous Lorentz manifolds. II. Siberian Mathematical Journal, 33(6), 1087-1093. https://doi.org/10.1007/bf00971031
Related
You May Also Like
Sequences of convex functions and estimates of the maximum of the solution of a parabolic equation
N. V. Krylov · 1976
65 citations
Asymptotic behavior of a solution to a boundary value problem in a perforated domain with oscillating boundary
A. G. Belyaev, A. L. Pyatnitskiî · 1998
51 citations