Can we bypass no-go theorem for Ricci-inverse Gravity?

Abstract

Recently, Amendola et al. proposed a geometrical theory of gravity containing higher-order derivative terms. The authors introduced anticurvature scalar (A), which is the trace of the inverse of the Ricci tensor (Aμ = Rμ-1). In this work, we consider two classes of Ricci-inverse -- Class I and Class II -- models. Class I models are of the form f(R, A) where f is a function of Ricci and anticurvature scalars. Class II models are of the form F(R, AμAμ) where F is a function of Ricci scalar and square of anticurvature tensor. For both these classes of models, we numerically solve the modified Friedmann equations in the redshift range 1500 < z < 0. We show that the late-time evolution of the Universe, i.e., evolution from matter-dominated epoch to accelerated expansion epoch, can not be explained by these two classes of models. Using the reduced action approach, we show that we can not bypass the no-go theorem for Ricci-inverse gravity models. Finally, we discuss the implications of our analysis for the early-Universe cosmology.