Quintessence from a state space perspective

Abstract

We use dynamical systems methods to study quintessence models in a spatially flat and isotropic spacetime with matter and a scalar field with potentials for which λ()=-V,/V is bounded, thereby going beyond the exponential potential for which λ() is constant. The scalar field equation of state parameter w plays a central role when comparing quintessence models with observations, but with the dynamical systems used to date w is an indeterminate, discontinuous, function on the state space in the asymptotically matter dominated regime. Our first main result is the introduction of new variables that lead to a regular dynamical system on a bounded three-dimensional state space on which w is a regular function. The solution trajectories in the state space then provide a visualization of different types of quintessence evolution, and how initial conditions affect the transition between the matter and scalar field dominated epochs; this is complemented by graphs w(N), where N is the e-fold time, which enables characterizing different types of quintessence evolution.