Fixed points and FLRW cosmologies: Flat case
Abstract
We use phase space method to study possible consequences of fixed points in flat FLRW models. One of these consequences is that a fluid with a finite sound speed, or a differentiable pressure, reaches a fixed point in an infinite time and has no finite-time singularities of types I, II and III described in hep-th/0501025. It is impossible for such a fluid to cross the phantom divide in a finite time. We show that a divergent , or a speed of sound is necessary but not sufficient condition for phantom crossing. We use pressure properties, such as asymptotic behavior and fixed points, to qualitatively describe the entire behavior of a solution in flat FLRW models. We discuss FLRW models with bulk viscosity , in particular, solutions for and cases, which can be expressed in terms of Lambert-W function. The last solution behaves either as a nonsingular phantom fluid or a unified dark fluid. Using causality and stability constraints, we show that the universe must end as a de Sitter space. Relaxing the stability constraint leads to a de Sitter universe, an empty universe, or a turnaround solution that reaches a maximum size, then recollapses.
Cite
@article{arxiv.1303.2014,
title = {Fixed points and FLRW cosmologies: Flat case},
author = {Adel Awad},
journal= {arXiv preprint arXiv:1303.2014},
year = {2013}
}
Comments
20 pages, 8 figures. Several references added as well as comments on the r=1/4 case