Exponential potentials and cosmological scaling solutions

Abstract

We present a phase-plane analysis of cosmologies containing a barotropic fluid with equation of state pγ = (γ-1) γ, plus a scalar field φ with an exponential potential V (-λ φ) where 2 = 8π G. In addition to the well-known inflationary solutions for λ2 < 2, there exist scaling solutions when λ2 > 3γ in which the scalar field energy density tracks that of the barotropic fluid (which for example might be radiation or dust). We show that the scaling solutions are the unique late-time attractors whenever they exist. The fluid-dominated solutions, where V(φ)/γ 0 at late times, are always unstable (except for the cosmological constant case γ = 0). The relative energy density of the fluid and scalar field depends on the steepness of the exponential potential, which is constrained by nucleosynthesis to λ2 > 20. We show that standard inflation models are unable to solve this `relic density' problem.

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