The Erez-Rosen Solution Versus the Hartle-Thorne Solution
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Date
2019-10
Authors
Boshkayev, Kuantay
Quevedo, Hernando
Nurbakyt, Gulmira
Malybayev, Algis
Urazalina, Ainur
Journal Title
Journal ISSN
Volume Title
Publisher
MDPI
Abstract
In this work, we investigate the correspondence between the Erez–Rosen and Hartle–Thorne solutions. We explicitly show how to establish the relationship and find the coordinate transformations between the two metrics. For this purpose the two metrics must have the same approximation and describe the gravitational field of static objects. Since both the Erez–Rosen and the Hartle–Thorne solutions are particular solutions of a more general solution, the Zipoy–Voorhees transformation is applied to the exact Erez–Rosen metric in order to obtain a generalized solution in terms of the Zipoy–Voorhees parameter δ=1+sq . The Geroch–Hansen multipole moments of the generalized Erez–Rosen metric are calculated to find the definition of the total mass and quadrupole moment in terms of the mass m, quadrupole q and Zipoy–Voorhees δ parameters. The coordinate transformations between the metrics are found in the approximation of ∼q. It is shown that the Zipoy–Voorhees parameter is equal to δ=1−q with s=−1 . This result is in agreement with previous results in the literature.
Description
https://www.mdpi.com/2073-8994/11/10/1324
Keywords
vacuum solutions, quadrupole moment, coordinate transformations
Citation
Boshkayev, K., Quevedo, H., Nurbakyt, G., Malybayev, A., & Urazalina, A. (2019). The Erez–Rosen Solution Versus the Hartle–Thorne Solution. Symmetry, 11(10), 1324. https://doi.org/10.3390/sym11101324