Power law α-Starobinsky inflation

Abstract

In this work we consider a generalization of Starobinsky inflation obtained by combining power law (Rβ), and α-Starobinsky inflation (E-model). The Einstein frame potential for this model is that of power law Starobinsky inflation modified by a parameter α in the exponential. After computing power spectra for scalar and tensor perturbations numerically, we perform MCMC analysis to put constraints on the potential parameters α, β and M, and the number of e-foldings Npivot during inflation, using Planck-2018, BICEP/Keck (BK18), DES and BAO observations. We find 10α= 0.37+0.82-0.85, β = 1.969+0.020-0.023, M=(3.54+2.62-1.73)× 10-5 and Npivot = 4710. With these mean values of the potential parameters α and β, and varying Npivot between 40 to 55, we also find that the r-ns predictions of our model lie well within the 1σ bounds of joint constraints from combined analysis of ACT, Planck-2018, BICEP and BAO observations. We compute the Bayesian evidences for our proposed model, power law Starobinsky inflation, α-Starobinsky inflation and Starobinsky inflation. Considering the Starobinsky model as the base model, we calculate the Bayes factor and find that our proposed model is mildly favored by the CMB and LSS observations.