Relation between the Turnaround radius and virial mass in f(R) model

Abstract

We investigate the relationship between the turnaround radius (Rt) and the virial mass (Mv) of cosmic structures in the context of model and in an f(R) model of modified gravity -- namely, the Hu-Sawicki model. The Rt is the distance from the center of the cosmic structure to the shell that is detaching from the Hubble flow at a given time, while the Mv is defined, for this work, as the mass enclosed within the volume where the density is 200 times the background density. We consider that gravitationally bound astrophysical systems follow a Navarro-Frenk-White density profile, while beyond the virial radius (Rv) the profile is approximated by the 2-halo term of the matter correlation function. By combining them together with the information drawn from solving the spherical collapse for the structures, we are able to connect two observables: the Rt and the Mv. We show that, in , the turnaround mass (Mt) at z=0 is related to the Mv of that same structure by Mt 3.07 \, Mv, while in terms of the radii we have that Rt 3.7 \, Rv (for Mv of 1013 \, h-1 \, M). In the f(R) model, we have Mt 3.43 \, Mv and Rt 4.1 \, Rv, for |fR0|=10-6 and the same mass scale. Therefore, the difference between and f(R) in terms of these observable relations is of order 10-20\% even for a relatively mild strength of the modification of gravity (|fR0|=10-6). For the Rt itself we find a difference of 9\% between the weakly modification in gravity considered in this work (|fR0|=10-6) and for a mass of 1013 \, h-1 \, M. Once observations allow precisions of this order or better in measurements Rt, as well as the Mv, these quantities will become powerful tests of modified gravity.