Litcius/Paper detail

Tidal deformability and radial oscillations of anisotropic polytropic spheres

José D. V. Arbañil, Grigoris Panotopoulos

2022Physical review. D/Physical review. D.13 citationsDOIOpen Access PDF

Abstract

We compute the equilibrium, the fundamental eigenfrequency of oscillations modes, and quadrupolar tidal deformability of anisotropic polytropic spheres. These studies are, respectively, performed through the numerical solution of the Tolman-Oppenheimer-Volkoff equation, Chandrasekhar radial oscillation equations, and nonlinear first-order Riccati equation for tidal deformability, all modified from their original version to include the anisotropic effects. For the polytropic exponent $\ensuremath{\gamma}=2$ and the anisotropic model of Cattoen, Faber, and Visser, we show that the anisotropy could be reflected in the radial pressure, energy density, speed of sound, radial stability, and tidal deformability.

Topics & Concepts

Polytropic processSPHERESMechanicsPhysicsAnisotropyClassical mechanicsAstronomyOpticsCosmology and Gravitation TheoriesAdvanced Differential Geometry ResearchGeophysics and Gravity Measurements
Tidal deformability and radial oscillations of anisotropic polytropic spheres | Litcius