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The effective dynamics of loop quantum $R^2$ cosmology

arXiv:1811.08235 · doi:10.1103/PhysRevD.99.064025

Abstract

The effective dynamics of loop quantum $f (R)$ cosmology in Jordan frame is considered by using the dynamical system method and numerical method. To make the analyze in detail, we focus on $R^2$ model since it is simple and favored from observations. In classical theory, $(ϕ= 1, \dotϕ = 0)$ is the unique fixed point in both contracting and expanding states, and all solutions are either starting from the fixed point or evolving to the fixed point; while in loop theory, there exists a new fixed point (saddle point) at $(ϕ\simeq 2 / 3,\dotϕ = 0)$ in contracting state. We find the two critical solutions starting from the saddle point control the evolution of the solutions starting from the fixed point $(ϕ= 1, \dotϕ = 0)$ to bounce at small values of scalar field in $0 <ϕ< 1$. Other solutions, including the large field inflation solutions, all have the history with $ϕ< 0$ which we think of as a problem of the effective theory of loop quantum $f(R)$ theory. Another different thing from loop quantum cosmology with Einstein-Hilbert action is that there exist many solutions do not have bouncing behavior.

8 pages, 7 figures