New models of chaotic inflation in supergravity

Abstract

We introduce a new class of models of chaotic inflation inspired by the superconformal approach to supergravity. This class of models allows a functional freedom of choice of the inflaton potential V = |f(φ)|2. The simplest model of this type has a quadratic potential m2φ2/2. Another model describes an inflaton field with the standard symmetry breaking potential λ2 (φ2-v2)2. Depending on the value of v and on initial conditions for inflation, the spectral index ns may take any value from 0.97 to 0.93, and the tensor-to-scalar ratio r may span the interval form 0.3 to 0.01. A generalized version of this model has a potential λ2 (φα-vα)2. At large φ and α > 0, this model describes chaotic inflation with the power law potential φ2α. For α < 0, this potential describes chaotic inflation with a potential which becomes flat in the large field limit. We further generalize these models by introducing a nonminimal coupling of the inflaton field to gravity. The mechanism of moduli stabilization used in these models allows to improve and generalize several previously considered models of chaotic inflation in supergravity.