2017
DOI: 10.1103/physrevd.96.123538
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Lagrangian theory of structure formation in relativistic cosmology. IV. Lagrangian approach to gravitational waves

Abstract: The relativistic generalization of the Newtonian Lagrangian perturbation theory is investigated. In previous works, the perturbation and solution schemes that are generated by the spatially projected gravitoelectric part of the Weyl tensor were given to any order of the perturbations, together with extensions and applications for accessing the nonperturbative regime. We here discuss more in detail the general first-order scheme within the Cartan formalism including and concentrating on the gravitational wave p… Show more

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Cited by 16 publications
(28 citation statements)
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“…Such a transformation does not require a 'Newtonian limit' (referring to a limit where the inverse of a causality constant goes to zero, 1/c → 0; for a detailed discussion of this notion, see [29]). It rather requires a restriction of the fluid deformations to integrable fluid deformations, named Minkowski Restriction (henceforth MR), defined and executed for various variables in a fluid-orthogonal framework in the series of papers [33,31,2,3,66], see especially [2,3]. The cosmological equations presented in this paper do not assume any particular spatial metric or any specific explicit form for the twice-covariant fluidorthogonal projecting tensor b = b µν dx µ ⊗ dx ν : they only depend functionally on these tensors.…”
Section: Recovering the Newtonian Form Of The Effective Cosmological ...mentioning
confidence: 99%
“…Such a transformation does not require a 'Newtonian limit' (referring to a limit where the inverse of a causality constant goes to zero, 1/c → 0; for a detailed discussion of this notion, see [29]). It rather requires a restriction of the fluid deformations to integrable fluid deformations, named Minkowski Restriction (henceforth MR), defined and executed for various variables in a fluid-orthogonal framework in the series of papers [33,31,2,3,66], see especially [2,3]. The cosmological equations presented in this paper do not assume any particular spatial metric or any specific explicit form for the twice-covariant fluidorthogonal projecting tensor b = b µν dx µ ⊗ dx ν : they only depend functionally on these tensors.…”
Section: Recovering the Newtonian Form Of The Effective Cosmological ...mentioning
confidence: 99%
“…This is a weak part of the Simsilun simulation and thus the non-zero production rate of the gravitational entropy of the virialised structures should be treated qualitatively. For quantitative results, more realistic simulations are needed, for example the one based on the relativistic Relativistic Zeldovich Approximation (RZA) [43,44,45,46,47,48]. The RZA is a general-relativistic approximation that extends the standard perturbation theory.…”
Section: Discussionmentioning
confidence: 99%
“…As remarked in [38], these integrability constraints are in general not satisfied in non-linear theory. The divergencefree condition (2.2) holds in first order Lagrangian perturbation theory [1], which includes non-linear effects as compared to the standard perturbation theory approach. We might thus expect the quiet universe assumption to hold in the linear and slightly non-linear regime of density contrasts.…”
Section: The Quiet Universe Modelsmentioning
confidence: 99%