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Anisotropic stars with a modified polytropic equation of state

Ksh. Newton Singh, S. K. Maurya, Piyali Bhar, Farook Rahaman

2020Physica Scripta33 citationsDOI

Abstract

Abstract In this article, we have presented the anisotropic stars by taking a modified polytropic equation of state ( p r = k ρ 1+1/ n − α , where k and α are constants) in the framework of the Korkina-Orlyanskii spacetime. In this study, we have discussed four different models as: (A) n = 1 (Bose–Einstein Condensate (BEC) neutron liquid), (B) n = 2, (C) n = 3/2 (Non-relativistic neutron gas, (D) n = 3 (Ultra relativistic Fermi-gas). Moreover, we have tested several physical properties for each model. To compare the stiffness of these four models, we have plotted the M − R curves, M − I curves and compression modulus. As per the M − R curves, the equation of state can hold maximum mass when the polytropic index in 2 and minimum mass when n = 1 (BEC neutron liquid). Further, the ultra relativistic Fermi gas ( n = 3) can also hold more M max than its non-relativistic counter part ( n = 3/2). These results are further supported by the compression modulus. Lastly, to show its physical validity we have fitted six well known compact stars in M − R curve within their observational error bars.

Topics & Concepts

Polytropic processPhysicsEquation of stateNeutron starAnisotropyCompressibilityStarsFermi liquid theoryMathematical physicsAtomic physicsQuantum mechanicsAstrophysicsThermodynamicsElectronPulsars and Gravitational Waves ResearchCosmology and Gravitation TheoriesAstrophysical Phenomena and Observations