Multidimensional integrable vacuum cosmology with two curvatures
Abstract
The vacuum cosmological model on the manifold R × M1 × … × Mn describing the evolution of n Einstein spaces of non-zero curvatures is considered. For n = 2 the Einstein equations are reduced to the Abel (ordinary differential) equation and solved, when (N1 = dim M1, N2 = dim M2) = (6,3), (5,5), (8,2). The Kasner-like behaviour of the solutions near the singularity ts +0 is considered (ts is synchronous time). The exceptional ("Milne-type") solutions are obtained for arbitrary n. For n=2 these solutions are attractors for other ones, when ts + ∞. For dim M = 10, 11 and 3 ≤ n ≤ 5 certain two-parametric families of solutions are obtained from n=2 ones using "curvature-splitting" trick. In the case n=2, (N1, N2)= (6,3) a family of non-singular solutions with the topology R7 × M2 is found.
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