Autonomous Dynamical System Approach for $f(R)$ Gravity

TL;DR

This paper develops an autonomous dynamical system framework for $f(R)$ gravity, analyzing stability and fixed points in vacuum and matter-filled scenarios, with detailed numerical and analytical results.

Contribution

It introduces a method to construct autonomous dynamical systems for $f(R)$ gravity, enabling stability analysis of de Sitter and matter-dominated solutions.

Findings

Stable and unstable de Sitter fixed points identified.

Numerical analysis confirms stability properties.

Exceptional features of $R^2$ gravity model discussed.

Abstract

In this work we shall investigate the cosmological dynamical system of $f(R)$ gravity, by constructing it in such a way so that it is rendered autonomous. We shall study the vacuum $f(R)$ gravity case, but also the case that matter and radiation perfect fluids are present along with the $f(R)$ gravity. The dynamical system is constructed in such a way so that the time-dependence of the system is contained in a single parameter which depends on the Hubble rate and it's second derivative. The autonomous structure of the dynamical system is achieved when this parameter is constant, therefore we focus on these cases. For the vacuum $f(R)$ case, we investigate two cases with the first leading to a stable de Sitter attractor fixed point but also to an unstable de Sitter fixed point, and the second is related to a matter dominated era. The stable de Sitter attractor is also found for the $f(R)$ gravity in the presence of matter and radiation perfect fluids. In all the cases we performed a detailed numerical analysis of the dynamical system and we also investigate in detail the stability of the resulting fixed points. Also, we present an exceptional feature of the $R^2$ gravity model, in the absence of perfect fluids. Finally, we investigate what is the approximate form of the $f(R)$ gravities near the stable and the unstable de Sitter fixed points.