Cosmology of non-minimal derivative coupling to gravity in Palatini formalism and its chaotic inflation

Abstract

We consider, in Palatini formalism, a modified gravity of which the scalar field derivative couples to Einstein tensor. In this scenario, Ricci scalar, Ricci tensor and Einstein tensor are functions of connection field. As a result, the connection field gives rise to relation, hμ = f gμ between effective metric, hμ and the usual metric gμ where f \,=\,1 - φ,αφ,α/2 . In FLRW universe, NMDC coupling constant is limited in a range of -2/ φ2 < ≤ ∞ preserving Lorentz signature of the effective metric. Slowly-rolling regime provides < 0 forbidding graviton from travelling at superluminal speed. Effective gravitational coupling and entropy of blackhole's apparent horizon are derived. In case of negative coupling, acceleration could happen even with w eff > -1/3. Power-law potentials of chaotic inflation are considered. For V φ2 and V φ4, it is possible to obtain tensor-to-scalar ratio lower than that of GR so that it satisfies r < 0.12 as constrained by Planck 2015 Ade:2015lrj. The V φ2 case yields acceptable range of spectrum index and r values. The quartic potential's spectrum index is disfavored by the Planck results. Viable range of for V φ2 case lies in positive region, resulting in less blackhole's entropy, superluminal metric, more amount of inflation, avoidance of super-Planckian field initial value and stronger gravitational constant.