Abstract
The paper aims to investigate curvature inheritance (CI) symmetry in M-projectively flat spacetimes. It is shown that the CI symmetry in M-projectively flat spacetime is a conformal motion. We have proved that M-projective curvature tensor follows the symmetry inheritance property along a vector field ζ, when spacetime admits the conditions of both CI symmetry and conformal motion or motion along the vector field ζ. Also, we have derived some results for M-projectively flat spacetime with perfect fluid following the Einstein field equations (EFEs) with a cosmological term and admitting the CI symmetry along the vector field ζ. We have shown that an M-projectively flat perfect fluid spacetime obeying the EFEs with a cosmological term and admitting the CI symmetry along a vector field ζ is either a vacuum or satisfies the vacuum-like equation of state. We have also shown that such spacetimes with the energy-momentum tensor of an electromagnetic field distribution do not admit any curvature symmetry of general relativity. Finally, an example of M-projectively flat spacetime has been exhibited.
Original language | English |
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Article number | 2350088 |
Journal | International Journal of Geometric Methods in Modern Physics |
Volume | 20 |
Issue number | 2 |
DOIs | |
Publication status | Published - 1 Feb 2023 |
Bibliographical note
Publisher Copyright:© 2023 World Scientific Publishing Company.
Keywords
- Einstein field equations
- M-projective curvature tensor
- conformal motion
- curvature inheritance
- flat spacetime
- perfect fluid spacetime