A new variable in scalar cosmology with exponential potential

Abstract

We present a new way describing the solution of the Einstein-scalar field theory with exponential potential V e6β φ/MPl in spatially flat Friedmann-Robertson-Walker space-time. We introduced a new time variable, L, which may vary in [-1,1]. The new time represents the state of the universe clearly because the equation of state at a given time takes the simple form, w= -1+ 2L2. The universe will inflate when |L|<1/3. For β≤ 1, the universe ends with its evolution at L=β. This implies that the equation of state at the end of the universe is nothing but w=-1+2β2. For β ≥ 1, the universe ends at L=1, where the equation of state of the universe is one. On the other hand, the universe always begins with w=1 at L= 1.