The effective phase space and e-folding of the Starobinsky and extended Starobinsky model of inflation

Abstract

For zero spatial curvature, cosmological phase space of Starobinsky and extended Starobinsky inflationary model show three apparent attractors; the fixed angle attractor in the large field limit, the final attractor representing reheating phase in the small field region, and the apparent attractor corresponding to the slow-roll condition connecting between the large-field and small-field region. To consider the total e-folding likelihood of the model, Remmen-Carroll conserved measure is constructed and normalized. Using the measure, the total e-folding number N and its expectation value N are calculated. Our results show that most classical slow-roll trajectories which intersect the Planck surface have N<60, and φ UV>5.5 M* Pl is required for N>60. It is found that for φ UV∈ [5.22,5.50]M* Pl which satisfies the constraint on the spectral index, ns = 0.9658 0.0040\,\,\,(68\%\,\, CL), the expectation value N 3.5 - 4 for trajectories intersecting the Planck surface in the Starobinsky model. For extended Starobinsky model with additional R3 term parametrized by a coupling parameter α, the expectation value when inflation starts from the top of the potential shifts to N = 4.025,4.336 for α = 10-4,6.5× 10-5 respectively. In the Starobinsky model even at very large inflaton cutoff φ UV where the field value is super-Planckian, the energy density from the (saturating) inflaton potential and the Hubble parameter are still sub-Planckian and therefore the inflation occurs within the semi-classical regime.