New features in curvaton model

Abstract

We demonstrate novel features in the behavior of the second and third order non-linearity parameters of the curvature perturbation, namely, fNL and gNL, arising from non-linear motion of curvaton field. We investigate two classes of potentials for the curvaton - the first has tiny oscillations super-imposed upon the quadratic potential. The second is characterized by a single 'feature' separating two quadratic regimes with different mass scales. The feature may either be a bump or a flattening of the potential. In the case of the oscillatory potential we find that as the width and height of superimposed oscillations increase, both fNL and gNL deviate strongly from their expected values from a quadratic potential. fNL changes sign from positive to negative as the oscillations in the potential become more prominent. Hence, this model can be severely constrained by convincing evidence from observations that fNL is positive. gNL, on the other hand, acquires very large negative values. For the the single feature potential, we find that fNL and gNL exhibit oscillatory behavior as a function of the parameter that controls the feature.