Stable exponential cosmological solutions with three different Hubble-like parameters in EGB model with a -term

Abstract

We consider a D-dimensional Einstein-Gauss-Bonnet model with a cosmological term and two non-zero constants: α1 and α2. We restrict the metrics to be diagonal ones and study a class of solutions with exponential time dependence of three scale factors, governed by three non-coinciding Hubble-like parameters: H ≠ 0, h1 and h2, obeying m H + k1 h1 + k2 h2 ≠ 0 and corresponding to factor spaces of dimensions m > 1, k1 > 1 and k2 > 1, respectively (D = 1 + m + k1 + k2). We analyse two cases: i) m < k1 < k2 and ii) 1< k1 = k2 = k, k ≠ m. We show that in both cases the solutions exist if α = α2 / α1 > 0 and α > 0 satisfies certain restrictions, e.g. upper and lower bounds. In case ii) explicit relations for exact solutions are found. In both cases the subclasses of stable and non-stable solutions are singled out. For m > 3 the case i) contains a subclass of solutions describing an exponential expansion of 3-dimensional subspace with Hubble parameter H > 0 and zero variation of the effective gravitational constant G. The case H = 0 is also considered.