Global properties of the growth index of matter inhomogeneities in the universe

Abstract

We perform here a global analysis of the growth index γ behaviour from deep in the matter era till the far future. For a given cosmological model in GR or in modified gravity, the value of γ(m) is unique when the decaying mode of scalar perturbations is negligible. However, γ∞, the value of γ in the asymptotic future, is unique even in the presence of a nonnegligible decaying mode today. Moreover γ becomes arbitrarily large deep in the matter era. Only in the limit of a vanishing decaying mode do we get a finite γ, from the past to the future in this case. We find further a condition for γ(m) to be monotonically decreasing (or increasing). This condition can be violated inside general relativity (GR) for varying wDE though generically γ(m) will be monotonically decreasing (like ), except in the far future and past. A bump or a dip in G eff can also lead to a significant and rapid change in the slope dγdm. On a background, a γ substantially lower (higher) than 0.55 with a negative (positive) slope reflects the opposite evolution of G eff. In DGP models, γ(m) is monotonically increasing except in the far future. While DGP gravity becomes weaker than GR in the future and wDGP -1, we still get γ∞DGP= γ∞ CDM=23. In contrast, despite GDGP eff G in the past, γ does not tend to its value in GR because dGDGP effdm|-∞ 0.