Cosmological singularity theorems for f(R) gravity theories

Abstract

In the present work some generalizations of the Hawking singularity theorems in the context of f(R) theories are presented. The assumptions are of these generalized theorems is that the matter fields satisfy the conditions (Tij-gij2 T)ki kj≥ 0 for any generic unit time like field, that the scalaron takes bounded positive values during its evolution, and that the resulting space time is globally hyperbolic. Then, if there exist a Cauchy hyper surface for which the expansion parameter θ of the geodesic congruence emanating orthogonally from satisfies some specific conditions, it may be shown that the resulting space time is geodesically incomplete. Some mathematical results of reference fewster are very important for proving this. The generalized theorems presented here apply directly some specific models such as the Hu-Sawicki or Starobinsky ones especif3, capoziello4. However, for other scenarios, some extra assumptions should be implemented for the geodesic incompleteness to take place. However, the negation of the hypothesis of these results does not necessarily imply that a singularity is absent, but that other mathematical results should be considered to prove that.