Scaling Solutions in Robertson-Walker Spacetimes
Abstract
We investigate the stability of cosmological scaling solutions describing a barotropic fluid with p=(γ-1) and a non-interacting scalar field φ with an exponential potential V(φ)=V0-φ. We study homogeneous and isotropic spacetimes with non-zero spatial curvature and find three possible asymptotic future attractors in an ever-expanding universe. One is the zero-curvature power-law inflation solution where φ=1 (γ<2/3,2<3γ and γ>2/3,2<2). Another is the zero-curvature scaling solution, first identified by Wetterich, where the energy density of the scalar field is proportional to that of matter with φ=3γ/2 (γ<2/3,2>3γ). We find that this matter scaling solution is unstable to curvature perturbations for γ>2/3. The third possible future asymptotic attractor is a solution with negative spatial curvature where the scalar field energy density remains proportional to the curvature with φ=2/2 (γ>2/3,2>2). We find that solutions with φ=0 are never late-time attractors.
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