On almost commutative Friedmann-Lema\itre-Robertson-Walker geometries

Abstract

We analyze the leading terms of the spectral action for a model of noncommutative geometry, which is a product of 4-dimensional Riemannian manifold with a two-point space exploring the previously neglected case when the metrics over each sheet are different. Assuming the Friedmann-Lema\itre-Robertson-Walker type of the metric for both sheets we obtain the action, which in addition to the the usual cosmological constant terms and the Einstein-Hilbert term involves a nonlinear interaction term. We study qualitative picture of potential consequences of such term in the basic cosmological models.