Role of $$f(R,T,R_{\mu \nu }T^{\mu \nu })$$ f ( R , T , R μ ν T μ ν ) model on the stability of cylindrical stellar model

Yousaf, Z.; Bhatti, M. Z.; Farwa, Ume

doi:10.1140/epjc/s10052-017-4923-5

Cited by 52 publications

(14 citation statements)

References 49 publications

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“…where total mass of the corresponding object is denoted by M(ν). We have found Darmois junction conditions and smooth matching criterion of the exterior and interior manifolds over the boundary for f (R, T, Q) gravity, which is provided by Yousaf et al [28] (after following Senovilla [56]). We establish some constraints at boundary surface r = r Σ as…”

Section: Field Equations Inmentioning

confidence: 64%

“…They also discussed the stability of some particular models in f (R, T, Q) theory by obtaining their solution through numerical techniques. Yousaf et al [26][27][28][29] studied the gravitational collapse in self-gravitating structures and calculated their equations of motion in f (R, T, Q) theory as well as some relations with Weyl tensor. Bhatti et al [30,31] studied the gravitational collapse in f (R, T, Q) theory and calculated few constraints under which the systems would enter into the collapsing phase.…”

Section: Introductionmentioning

confidence: 99%

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New Definition of Complexity Factor in $f(R,T,R_{μν}T^{μν})$ Gravity

Yousaf,

Bhatti,

Naseer

2020

Preprint

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This paper is devoted to present new definition of complexity factor for static cylindrically symmetric matter configurations in f (R, T, R µν T µν ) gravity. For this purpose, we have considered irrotational static cylindrical spacetime coupled with a locally anisotropic relativistic fluid. After formulating gravitational field and conservation equations, we have performed orthogonal splitting of the Riemann curvature tensor. Unlike GR (for spherical case) the one of the structure scalars X T F , has been identified to be a complexity factor. This factor contains effective forms of the energy density, and anisotropic pressure components. Few peculiar relations among complexity factor, Tolman mass and Weyl scalar are also analyzed with the modified f (R, T, R µν T µν ) corrections.

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Section: Field Equations Inmentioning

confidence: 64%

Section: Introductionmentioning

confidence: 99%

New Definition of Complexity Factor in $f(R,T,R_{μν}T^{μν})$ Gravity

Yousaf,

Bhatti,

Naseer

2020

Preprint

Self Cite

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“…where M is a gravitating mass of the corresponding object. For the smooth matching of outer and inner manifold across the boundary, we consider Darmois junction conditions and matching criterion provided by Yousaf et al [26] (after following Senovilla [48]) for f (R, T, Q) gravity. At boundary surface r = r Σ =, we found that…”

Section: Modified Field Equationsmentioning

confidence: 99%

“…They found numerical solution of some special models of f (R, T, Q) theory to discuss their stability. In the gravitational collapse of spherical structure, Bhatti et al and his collaborators [25][26][27][28] analyzed the role of the physical variables on the dynamical evolution of self-gravitating systems and found the relation of structural variables with that of Weyl tensor in f (R, T, Q) theory.…”

Section: Introductionmentioning

confidence: 99%

Influence of Modification of Gravity on the Complexity Factor of Static Spherical Structures

Yousaf,

Khlopov,

Bhatti

et al. 2020

Preprint

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The aim of this paper is to generalize the definition of complexity for the static selfgravitating structure in f (R, T, Q) gravitational theory, where R is the Ricci scalar, T is the trace part of energy momentum tensor and Q ≡ R αβ T αβ . In this context, we have considered locally anisotropic spherical matter distribution and calculated field equations and conservation laws. After the orthogonal splitting of the Riemann curvature tensor, we found the corresponding complexity factor with the help of structure scalars. It is seen that the system may have zero complexity factor if the effects of energy density inhomogeneity and pressure anisotropy cancel the effects of each other. All of our results reduce to general relativity on assuming f (R, T, Q) = R condition.

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“…ey [33] analyzed the role of electric charge on the entire analytical solutions which are stable, nonevent horizon and singularity free in nature. Also, Yousaf and his collaborators [34][35][36][37][38] have worked on the stability of gravastars in several modified theories of gravity.…”

Section: Introductionmentioning

confidence: 99%

Isotropic Gravastar Model in Rastall Gravity

Abbas

Majeed

2020

Advances in Astronomy

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In the present paper, we have introduced a new model of gravastar with an isotropic matter distribution in Rastall gravity by the Mazur–Mottola (2004) mechanism. Mazur–Mottola approach is about the construction of gravastar which is predicted as an alternative to black hole. By following this convention, we define gravastar in the form of three phases. The first one is an interior phase which has negative density; the second part consists of thin shell comprising ultrarelativistic stiff fluid for which we have discussed the length, energy, and entropy. By the graphical analysis of entropy, we have shown that our proposed thin shell gravastar model is potentially stable. The third phase of gravastar is defined by the exterior Schwarzschild geometry. For the interior of gravastar, we have found the analytical solutions free from any singularity and the event horizon in the framework of Rastall gravity.

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Role of $$f(R,T,R_{\mu \nu }T^{\mu \nu })$$ f ( R , T , R μ ν T μ ν ) model on the stability of cylindrical stellar model

Cited by 52 publications

References 49 publications

New Definition of Complexity Factor in $f(R,T,R_{μν}T^{μν})$ Gravity

New Definition of Complexity Factor in $f(R,T,R_{μν}T^{μν})$ Gravity

Influence of Modification of Gravity on the Complexity Factor of Static Spherical Structures

Isotropic Gravastar Model in Rastall Gravity

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