A Survey through Conformal Time

Abstract

We revisit conformal time η in a spatially flat Friedmann--Robertson--Walker universe and use a 1+1-dimensional setting as a technically transparent pedagogical arena. Our purpose is to clarify the relation among cosmic time t, conformal time η, and the scale factor a(t), and then to follow how this relation governs the geodesics of freely moving particles and the curvature of the corresponding manifold. The radiation-dominated, matter-dominated, and exact vacuum-only de Sitter cases are treated separately, because each of them produces a distinct conformal-time dependence and therefore a distinct geodesic structure. We then write the affine-parameter formalism in a form that is genuinely general for any spatially flat conformal metric, and we record the straightforward extension to the spatially flat 3+1 case. The presentation remains elementary in spirit, but the notation, the curvature formulas, and the de Sitter interpretation are kept explicit.