Conformally homogeneous Lorentz manifolds. II

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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).
Google Scholar
M. N. Podoksënov, “Pseudo-Riemannian manifolds with the essential group of conformal transformations,” submitted to VINITI on June 26, 1988, No. 4201-B89.
M. N. Podoksënov, “Lie groups with left-invariant connections and the groups of conformal transformations of pseudo-Riemannian manifolds,” Kandid. Dissert., Novosibirsk (1989).
D. V. Alekseevskiî, “Selfsimilar Lorentzian manifolds,” Ann. Global. Anal. Geom.,3, No. 1, 59–84 (1985).
Google Scholar
D. V. Alekseevskiî, “Groups of conformal transformations of Riemannian spaces,” Mat. Sb.,89, No. 2, 280–296 (1972).
Google Scholar
L. Ph. Eisenhart, Riemannian Geometry [Russian translation], Izdat. Inostr. Lit., Moscow (1948).
Google Scholar
Sh. Kobayashi and K. Homizu, Foundations of Differential Geometry. Part 1 [Russian translation], Nauka, Moscow (1981).
Google Scholar

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M. N. Podoksënov
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Vitebsk. Translated fromSibirskiî Matematicheskiî Zhurnal, Vol. 33, No. 6, pp. 154–161, November–December, 1992.

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Podoksënov, M.N. Conformally homogeneous Lorentz manifolds. II. Sib Math J 33, 1087–1093 (1992). https://doi.org/10.1007/BF00971031

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