Stable exponential cosmological solutions with three different Hubble-like parameters in EGB model with a $\Lambda$-term
Abstract
We consider a -dimensional Einstein-Gauss-Bonnet model with a cosmological term and two non-zero constants: and . 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: , and , obeying and corresponding to factor spaces of dimensions , and , respectively (). We analyse two cases: i) and ii) , . We show that in both cases the solutions exist if and 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 the case i) contains a subclass of solutions describing an exponential expansion of -dimensional subspace with Hubble parameter and zero variation of the effective gravitational constant . The case is also considered.
Cite
@article{arxiv.1906.10391,
title = {Stable exponential cosmological solutions with three different Hubble-like parameters in EGB model with a $\Lambda$-term},
author = {K. K. Ernazarov and V. D. Ivashchuk},
journal= {arXiv preprint arXiv:1906.10391},
year = {2020}
}
Comments
38 pages, 6 figures, LaTex, Section 7 and Figure 6 are added