Reduction of Homogeneous Pseudo-Kähler Structures by One-Dimensional Fibers
Abstract
:1. Introduction
2. Preliminaries
2.1. Homogeneous Structures
- Let be an almost pseudo-Hermitian manifold, that is, a pseudo-Riemannian manifold equipped with a -tensor J that is a point-wise isometry. A pseudo-Hermitian homogeneous structure S is a -tensor satisfying (1) and . If in addition is Kähler (that is, ), and we fix a point , , the linear space of tensors to be considered isTheir expressions can be found in the Appendix A.
- Let be an almost contact metric manifold, that is (for example, see [12]), a pseudo-Riemannian manifold equipped with a -tensor and a vector field (the 1-form being its dual with respect to g) such thatbeing the standard complex structure of . That is, is the subgroup of or (depending on the value of ) stabilizing both and . Then, decomposes into two mutually orthogonal submodules,Additionally, these two submodules decompose in mutually orthogonal and irreducible -submodules
2.2. Reduction of a Homogeneous Structure
3. Fibrations of Pseudo-Hermitian over Almost Contact Metric Manifolds
4. Reduction of Homogeneous Structures
5. Conclusions
- We showed a reduction procedure by one dimensional fibers between almost pseudo-Hermitian manifolds to almost contact metric manifolds of general type in the sense of Chinea-González (cf. [8]).
- We applied this fibration result to the case of homogeneous structures. In this context we got a reduction result between pseudo-Kähler homogeneous structures to almost contact metric homogeneous structures. Moreover, the reduced manifold lies in of the Chinea-González classification (cf. [8]).
- We proved that the reduction procedure sends pseudo-Kähler homogeneous structures of linear type to almost contact metric homogeneous structures of linear type. Indeed, we showed the explicit expressions of the reduced homogeneous structure and gave a characterization of the reduced manifold being cosymplectic and Sasakian.
- The study of homogeneous structures of linear type is connected with models of singular plane waves in general relativity (see [15] for the real case and [16] for the pseudo-Kähler setting explored in this work). The models associated with the particular instances that arose from our results, along with some other examples, will be the topic of future research.
Author Contributions
Funding
Conflicts of Interest
Appendix A. Expressions of Homogeneous Structures
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Carmona Jiménez, J.L.; Castrillón López, M. Reduction of Homogeneous Pseudo-Kähler Structures by One-Dimensional Fibers. Axioms 2020, 9, 94. https://doi.org/10.3390/axioms9030094
Carmona Jiménez JL, Castrillón López M. Reduction of Homogeneous Pseudo-Kähler Structures by One-Dimensional Fibers. Axioms. 2020; 9(3):94. https://doi.org/10.3390/axioms9030094
Chicago/Turabian StyleCarmona Jiménez, José Luis, and Marco Castrillón López. 2020. "Reduction of Homogeneous Pseudo-Kähler Structures by One-Dimensional Fibers" Axioms 9, no. 3: 94. https://doi.org/10.3390/axioms9030094
APA StyleCarmona Jiménez, J. L., & Castrillón López, M. (2020). Reduction of Homogeneous Pseudo-Kähler Structures by One-Dimensional Fibers. Axioms, 9(3), 94. https://doi.org/10.3390/axioms9030094