New family of inhomogeneous γ-law cosmologies: example of gravitational waves in a homogeneous p=/3 background
Abstract
We present an explicit three-parameter class of p=γ , (-1/3≤γ<1), cosmological models admitting a two-dimensional group G2 of isometries acting on spacelike surfaces. The family is self-similar in the sense that it has a further homothetic vector field and it contains subfamilies of both (previously unknown) tilted and non-tilted Bianchi models with that equation of state. This is the first algebraically general class of solutions of this kind including dust inhomogeneous solutions. The whole class presents a universal spacelike big-bang singularity in the finite past. More interestingly, the case p= /3 constitutes a new two-parameter inhomogeneous subfamily which can be viewed as a Bianchi V background with a gravitational wave travelling orthogonally to the surfaces of transitivity of the G2 group. This wave generates the inhomogeneity of the spacetime and is related to the sound waves tilting the perfect fluid. It seems to be the first explicit exact example of a gravitational wave travelling along a homogeneous background that has a realistic equation of state p= /3.
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