Litcius/Paper detail

Stability analysis of axial geometry with anisotropic background in f(R,T) gravity

M. Z. Bhatti, Z. Yousaf, M. Yousaf

2023Modern Physics Letters A17 citationsDOI

Abstract

In this paper, we highlight the variables preserving stability of a very restricted class of anisotropic axial symmetrical compact geometry in the scenario of [Formula: see text] gravity, where [Formula: see text] stands for energy–momentum tensor’s trace and [Formula: see text] is invariant Ricci curvature. In the framework of [Formula: see text] gravity, we set up field equations as well as non-conservation equations. We use a perturbation technique for all variables involved in non-conservation equations, field equations, extra curvature terms of modified gravity as well as for considered gravity model (i.e. [Formula: see text]) to evaluate the collapse equation. We establish certain significant constraints for the stiffness parameter [Formula: see text] in Newtonian [Formula: see text] and post-Newtonian [Formula: see text] approximation to study the dynamical instability of a stellar compact configuration. In order to preserve the stability of an anisotropic self-gravitating axially symmetric configuration, we place certain restrictions on physical quantities. To examine the stable and unstable behavior of considered geometry via graphical approaches, we include schematic diagrams at the [Formula: see text] and [Formula: see text] eras.

Topics & Concepts

PhysicsCurvatureClassical mechanicsMathematical physicsRiemann curvature tensorStress–energy tensorGeometryQuantum mechanicsExact solutions in general relativityMathematicsCosmology and Gravitation TheoriesBlack Holes and Theoretical PhysicsSolar and Space Plasma Dynamics