A geometric description of the non-Gaussianity generated at the end of multi-field inflation

Abstract

In this paper we mainly focus on the curvature perturbation generated at the end of multi-field inflation, such as the multi-brid inflation. Since the curvature perturbation is produced on the super-horizon scale, the bispectrum and trispectrum have a local shape. The size of bispectrum is measured by fNL and the trispectrum is characterized by two parameters τNL and gNL. For simplicity, the trajectory of inflaton is assumed to be a straight line in the field space and then the entropic perturbations do not contribute to the curvature perturbation during inflation. As long as the background inflaton path is not orthogonal to the hyper-surface for inflation to end, the entropic perturbation can make a contribution to the curvature perturbation at the end of inflation and a large local-type non-Gaussiantiy is expected. An interesting thing is that the non-Gaussianity parameters are completely determined by the geometric properties of the hyper-surface of the end of inflation. For example, fNL is proportional to the curvature of the curve on this hyper-surface along the adiabatic direction and gNL is related to the change of the curvature radius per unit arc-length of this curve. Both fNL and gNL can be positive or negative respectively, but τNL must be positive and not less than ((6/5)fNL)2.