Equilibrium points of the tilted perfect fluid Bianchi VIh state space
Abstract
We present the full set of evolution equations for the spatially homogeneous cosmologies of type VIh filled with a tilted perfect fluid and we provide the corresponding equilibrium points of the resulting dynamical state space. It is found that only when the group parameter satisfies h>-1 a self-similar solution exists. In particular we show that for h>- 19 there exists a self-similar equilibrium point provided that γ ∈ (2(3+-h)5+3-h, 32) whereas for h<- 19 the state parameter belongs to the interval γ ∈ (1,2(3+-h)5+3-h) . This family of new exact self-similar solutions belongs to the subclass nα α =0 having non-zero vorticity. In both cases the equilibrium points have a five dimensional stable manifold and may act as future attractors at least for the models satisfying nα α =0. Also we give the exact form of the self-similar metrics in terms of the state and group parameters. As an illustrative example we provide the explicit form of the corresponding self-similar radiation model (γ= 43), parametrised by the group parameter h. Finally we show that there are no tilted self-similar models of type III and irrotational models of type VIh.
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