Exact general solutions for cosmological scalar field evolution in a background-dominated expansion

Abstract

We derive exact general solutions (as opposed to attractor particular solutions) and corresponding first integrals for the evolution of a scalar field φ in a universe dominated by a background fluid with equation of state parameter wB. In addition to the previously-examined linear [V(φ) = V0 φ] and quadratic [V(φ) = V0 φ2] potentials, we show that exact solutions exist for the power law potential V(φ) = V0 φn with n = 4(1+wB)/(1-wB) + 2 and n = 2(1+wB)/(1-wB). These correspond to the potentials V(φ) = V0 φ6 and V(φ) = V0 φ2 for matter domination and V(φ) = V0 φ10 and V(φ) = V0 φ4 for radiation domination. The φ6 and φ10 potentials can yield either oscillatory or non-oscillatory evolution, and we use the first integrals to determine how the initial conditions map onto each form of evolution. The exponential potential yields an exact solution for a stiff/kination (wB = 1) background. We use this exact solution to derive an analytic expression for the evolution of the equation of state parameter, wφ, for this case.