Investigation of four-dimensional locally homogeneous (Pseudo)Riemannian Manifolds with an isotropic Schouten — Weyl Tensor

  • П.Н. Клепиков Алтайский государственный университет (Барнаул, Россия) Email: klepikov.math@gmail.com
  • С.В. Клепикова Алтайский государственный университет (Барнаул, Россия) Email: klepikova.svetlana.math@gmail.com
  • К.О. Кизбикенов Алтайский государственный педагогический университет (Барнаул, Россия) Email: kizbikenov@mail.ru
  • И.В. Эрнст Алтайский государственный университет (Барнаул, Россия) Email: igeh@ya.ru
DOI_disc_logo https://doi.org/10.14258/izvasu(2018)4-14
Keywords: (pseudo)Riemannian manifold, isotropic Schouten — Weyl tensor, systems of computer mathematics

Abstract

Locally homogeneous (pseudo)Riemannian manifolds were studied by many mathematicians. Their generalization is a locally conformally homogeneous (pseudo)Riemannian manifolds on which a conformal transformations act transitively. Such manifolds were previously studied both in the Riemannian case and in the pseudo-Riemannian case.

In the paper of E.D. Rodionov, V.V. Slavsky and L.N. Chibrikova it was proved that a locally homogeneous manifold could be obtained from a locally conformally homogeneous (pseudo)Rieman-nian manifolds by a conformal deformation if the Weyl tensor (or the Schouten — Weyl tensor in the three-dimensional case) has a nonzero squared length. Thus, the problem arises of studying (pseudo)Riemannian locally homogeneous and locally conformally homogeneous manifolds, the Schouten — Weyl tensor of which has zero squared length, and itself is not equal to zero.

In this paper, we present an algorithm that can solve the classification problem of four-dimensional locally homogeneous (pseudo)Riemannian manifolds with a nontrivial isotropy subgroup and an isotropic Schouten — Weyl tensor.

DOI 10.14258/izvasu(2018)4-14

Downloads

Download data is not yet available.

Metrics

Metrics Loading ...

References

Rodionov E.D., Slavskii V.V. Conformal deformations of the Riemannian metrics and homogeneous Riemannian spaces // Comment. Math. Univ. Carolin. - 2002. - Vol. 43, № 2.

Rodionov E.D., Slavskii V.V., Chibrikova L.N. Locally conformally homogeneous pseudo-Riemannian spaces // Siberian Advances in Mathematics. — 2007. — Vol. 17, № 3.

Khromova O.P., Klepikov P.N., Klepikova S.V., Rodionov E.D. About the Schouten-Weyl tensor on 3-dimensional Lorenzian Lie groups // arXiv:1708.06614, 2017.

Besse A. Einstein manifolds — Springer — Verlag, Berlin — Heidelberg, 1987. DOI: 10.1007/978-3-540-74311-8

Salimi Moghaddam H.R. On Ricci Soliton metrics conformally equivalent to left invariant metrics // arXiv:1401.0744, 2016.

Podoksenov M.N. Conformally homogeneous Lorentz manifolds. II // Siberian Mathematical Journal. — 1992. — Vol. 33, № 6.

Liimatainen T., Salo M. Nowhere conformally homogeneous manifolds and limiting Carleman weights // Inverse Problems and Imaging. — 2012. — Vol. 6, № 3. DOI: 10.3934/ipi.2012.6.523

Alekseevsky D. Lorentzian manifolds with transitive conformal group // Note di Matematica. — 2017. — Vol. 37, № 1. DOI: 10.1285/i15900932v37suppl1p35

Клепиков П.Н., Родионов Е.Д. Применение пакетов символьных вычислений к исследованию алгебраических солитонов Риччи на однородных (псевдо)римановых многообразиях // Известия АлтГУ. — 2017. — № 4 (96). DOI: 10.14258/izvasu(2017)4-19

Хромова О.П. Применение пакетов символьных вычислений к исследованию оператора одномерной кривизны на нередуктивных однородных псевдоримановых многообразиях // Известия АлтГУ. — 2017. — № 1 (93). DOI: 10.14258/izvasu(2017)1-28

Komrakov B.B. Einstein-Maxwell equation on four-dimensional homogeneous spaces // Lobachevskii J. Math. — 2001. — Vol. 8.

Published
2018-09-14
How to Cite
Клепиков П., Клепикова С., Кизбикенов К., Эрнст И. Investigation of four-dimensional locally homogeneous (Pseudo)Riemannian Manifolds with an isotropic Schouten — Weyl Tensor // Izvestiya of Altai State University, 2018, № 4(102). P. 79-82 DOI: 10.14258/izvasu(2018)4-14. URL: http://izvestiya.asu.ru/article/view/%282018%294-14.
Issue
No 4(102) (2018): Izvestiya of Altai State University
Section
Математика и механика

Copyright (c) 2018 П.Н. Клепиков, С.В. Клепикова, К.О. Кизбикенов, И.В. Эрнст

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

Izvestiya of Altai State University is a golden publisher, as we allow self-archiving, but most importantly we are fully transparent about your rights.

Authors may present and discuss their findings ahead of publication: at biological or scientific conferences, on preprint servers, in public databases, and in blogs, wikis, tweets, and other informal communication channels.

Izvestiya of Altai State University allows authors to deposit manuscripts (currently under review or those for intended submission to Izvestiya of Altai State University) in non-commercial, pre-print servers such as ArXiv.

Authors who publish with this journal agree to the following terms:

  1. Authors retain copyright and grant the journal right of first publication with the work simultaneously licensed under a Creative Commons Attribution License (CC BY 4.0) that allows others to share the work with an acknowledgement of the work's authorship and initial publication in this journal.
  2. Authors are able to enter into separate, additional contractual arrangements for the non-exclusive distribution of the journal's published version of the work (e.g., post it to an institutional repository or publish it in a book), with an acknowledgement of its initial publication in this journal.
  3. Authors are permitted and encouraged to post their work online (e.g., in institutional repositories or on their website) prior to and during the submission process, as it can lead to productive exchanges, as well as earlier and greater citation of published work (See The Effect of Open Access).