Maximum turnaround radius in $f(R)$ gravity

TL;DR

This paper derives an analytic expression for the maximum turnaround radius in $f(R)$ gravity, providing a criterion to test the viability of $f(R)$ models based on their ability to support large-scale structure stability.

Contribution

It offers the first analytic formula for the turnaround radius in $f(R)$ gravity without assuming a specific form of $f(R)$, and establishes viability conditions for these models.

Findings

Derived an analytic expression for $r_{ta}$ in $f(R)$ models.

Established a stability criterion for large-scale structures in $f(R)$ gravity.

Provided bounds on $f'(R)$ for constant curvature models.

Abstract

The accelerating behavior of cosmic fluid opposes to the gravitational attraction, at present epoch, whereas standard gravity is dominant at small scales. As a consequence, there exists a \emph{point} where the effects are counterbalanced, dubbed \emph{turnaround radius}, $r_{\text{ta}}$. By construction, it provides a bound on maximum structure sizes of the observed universe. Once an upper bound on $r_{\text{ta}}$ is provided, i.e. $R_{\text{TA,max}}$, one can check whether cosmological models guarantee structure formation. Here, we focus on $f(R)$ gravity, without imposing \emph{a priori} the form of $f(R)$. We thus provide an analytic expression for the turnaround radius in the framework of $f(R)$ models. To figure this out, we compute the turnaround radius in two distinct cases: 1) under the hypothesis of static and spherically symmetric space-time, and 2) by using the cosmological perturbation theory. We thus find a criterion to enable large scale structures to be stable in $f(R)$ models, circumscribing the class of $f(R)$ theories as suitable alternative to dark energy. In particular, we get that for constant curvature, the viability condition becomes $R_{\text{dS}}f'(R_{\text{dS}}) \leq 5.48 \Lambda \Rightarrow f'(R_{\text{dS}}) \leq 1.37$, with $\Lambda$ and $R_{\text{dS}}$ respectively the observed cosmological constant and the Ricci curvature. This prescription rules out models which do not pass the aforementioned $R_{\text{TA,max}}$ limit.