Gödel-type solutions in $$f(R,T,R_{\mu \nu } T^{\mu \nu }$$) gravity

Abstract

AbstractIn this paper, $$f(R,T,R_{\mu \nu } T^{\mu \nu }$$ f ( R , T , R μ ν T μ ν ) gravity is considered. It is a modified theory of gravity that exhibits a strong coupling of gravitational and matter fields. Therefore, if gravity is governed by this model a number of issues must be re-examined. In this context, the question of causality and its violation is studied. Such analysis is carried out using the Gödel-type solutions. It is shown that this model allows both causal and non-causal solutions. These solutions depend directly on the content of matter present in the universe. For the non-causal solution, a critical radius is calculated, beyond which causality is violated. Taking different matter contents, an infinite critical radius emerges that leads to a causal solution. In this causal solution, a natural relationship emerges between the parameters that determine the matter considered.