Anisotropic compact stars in the Buchdahl model: A comprehensive study

Maurya, S. K.; Banerjee, Ayan; Jasim, M. K.; Kumar, Jitendra; Prasad, Amit Kumar; Pradhan, Anirudh

doi:10.1103/physrevd.99.044029

Cited by 150 publications

(74 citation statements)

References 111 publications

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“…Figures 13 and 14 illustrate that the energy momentum tensor of all radii obey the condition (ix). Hence for the model parameters chosen the solution comply with requirements (i)-(ix) of a realistic star and in corroboration with reported physical quantities determined by experimental observation on strange star candidates RXJ 1856-37, Her X-1, SAX J1808.4-3658, SMC X-1 and Cen X-3 [52][53][54].…”

Section: Physical Analysissupporting

confidence: 83%

Anisotropic generalization of isotropic models via hypergeometric equation

Nasheeha¹,

Thirukkanesh²,

Ragel

2020

Eur. Phys. J. C

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We study Einstein's field equations to describe static spherically symmetric relativistic compact objects with anisotropic matter distribution, and generate two classes of exact solutions by choosing a generalized form for one of the gravitational potentials and a particular form for the measure of anisotropy. This is achieved by transforming the Einstein's field equation to a hypergeometric equation. The generated models generalize the isotropic models of Durgapal-Bannerji, Tikekar and Vaidya-Tikekar. The physical viability of the model is examined and compared with observational results of strange star candidates.

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Section: Physical Analysissupporting

confidence: 83%

Anisotropic generalization of isotropic models via hypergeometric equation

Nasheeha¹,

Thirukkanesh²,

Ragel

2020

Eur. Phys. J. C

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“…For a physically stable configuration, the core and envelope of the stars should satisfy the following inequalities simultaneously (which are known as energy conditions [29]): (i) null energy condition ρ + p r ≥ 0 (NEC) (ii) weak energy conditions ρ + p r ≥ 0, ρ ≥ 0 (WEC r ) and ρ + p t ≥ 0, ρ ≥ 0 Fig. 12, it is clearly visible that the variation of energy conditions with r of the core and the envelope of both the stars are continuous at the interface and satisfying realistic conditions.…”

Section: Energy Conditionsmentioning

confidence: 99%

“…In their solution, apart from the continuity of metric potentials, pressure, one more physical parameter, i.e., energy density was continuous at the junction. In recent past, many attempts have been made by various authors to find exact analytic solutions of the Einstein field system using linear EOS with MIT bag model [25][26][27][28][29][30][31] as well as quadratic EOS [32][33][34][35][36][37][38][39]. On the other hand, various authors [40][41][42][43][44][45] have also explored new solutions of the Einstein field equations for anisotropic fluid under the Karmarkar condition [46].…”

Section: Introductionmentioning

confidence: 99%

Core-envelope model of super dense star with distinct equation of states

2019

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The aim of the present paper is to study an anisotropic spherically symmetric core-envelope model of a super dense star in which core is equipped with linear equation of state, consistent with the quark matter while the envelope is considered to be of quadratic equation of state by adopting the philosophy of Takisa et al. (Pramana J Phys 92:40, 2019). We demonstrate that all the physical parameters are realistic within the core as well as envelope of the stellar object and continuous at the junction. Our model is shown to be physically viable and substantiate with the strange stars SAX J1808.4-3658 and 4U1608-52. Further, We infer that if the mass of the star increases then central density results to higher values and core shrinks, which justifies the dominating effect of gravity for higher mass celestial objects.

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“…Before proceeding to the next section we will mention some important comments here: (a) Initially we will solve the field Eqs. (33)- (35) via embedding class one condition to obtain a new solution for the anisotropic star. (b) Then we will solve of Maxwell Eqs.…”

Section: Embedding Class One Condition Associated With the Geometry {mentioning

confidence: 99%

“…Recently, Maurya et al [24][25][26][27][28][29] have discovered several charged and uncharged solution for the compact stars. The effect and role of anisotropy with and without equation of state (EOS) were proposed by Harko and Mak [30], Maurya et al [31][32][33][34][35], Varela et al [36]. On the other hand, Sharma and Maharaj [37] have obtained an analytical extended solution by taking a specific choice of mass function.…”

Section: Introductionmentioning

confidence: 99%

A completely deformed anisotropic class one solution for charged compact star: a gravitational decoupling approach

Maurya

2019

Eur. Phys. J. C

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In this article, we have investigated a new completely deformed embedding class one solution for the compact star in the framework of charged anisotropic matter distribution. For determining of this new solution, we deformed both gravitational potentials as ν → ξ + α h(r) and e −λ → e −μ + α f (r) by using Ovalle (Phys Lett B 788:213, 2019) approach. The gravitational deformation divides the original coupled system into two individual systems which are called the Einstein's system and Maxwell-system (known as quasi-Einstein system), respectively. The Einstein's system is solved by using embedding class one condition in the context of anisotropic matter distribution while the solution of Maxwell-system is determined by solving of corresponding conservation equation via assuming a well-defined ansatz for deformation function h(r). In this way, we obtain the expression for the electric field and another deformation function f (r). Moreover, we also discussed the physical validity of the solution for the coupled system by performing several physical tests. This investigation shows that the gravitational decoupling approach is a powerful methodology to generate a well-behaved solution for the compact object.

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Anisotropic compact stars in the Buchdahl model: A comprehensive study

Cited by 150 publications

References 111 publications

Anisotropic generalization of isotropic models via hypergeometric equation

Anisotropic generalization of isotropic models via hypergeometric equation

Core-envelope model of super dense star with distinct equation of states

A completely deformed anisotropic class one solution for charged compact star: a gravitational decoupling approach

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