Abstract
We consider a five-dimensional Einstein–Chern–Simons action which is composed of a gravitational sector and a sector of matter where the gravitational sector is given by a Chern–Simons gravity action instead of the Einstein–Hilbert action and where the matter sector is given by the so-called perfect fluid. It is shown that (i) the Einstein–Chern–Simons (EChS) field equations subject to suitable conditions can be written in a similar way to the Einstein–Maxwell field equations; (ii) these equations have solutions that describe an accelerated expansion for the three possible cosmological models of the universe, namely, spherical expansion, flat expansion, and hyperbolic expansion when \(\alpha \), a parameter of the theory, is greater than zero. This result allows us to conjecture that these solutions are compatible with the era of dark energy and that the energy–momentum tensor for the field \(h^{a}\), a bosonic gauge field from the Chern–Simons gravity action, corresponds to a form of positive cosmological constant. It is also shown that the EChS field equations have solutions compatible with the era of matter: (i) In the case of an open universe, the solutions correspond to an accelerated expansion (\(\alpha >0\)) with a minimum scale factor at initial time that, when time goes to infinity, the scale factor behaves as a hyperbolic sine function. (ii) In the case of a flat universe, the solutions describe an accelerated expansion whose scale factor behaves as an exponential function of time. (iii) In the case of a closed universe there is found only one solution for a universe in expansion, which behaves as a hyperbolic cosine function of time.
Highlights
[ J ab, J cd ] = ηad J bc − ηac J bd + ηbc J ad − ηbd J ac, [ Pa, J bc] = ηab P c − ηac P b, [ J ab, Zcd ] = ηad Zbc − ηac Zbd + ηbc Zad − ηbd Zac, [Za, J bc] = ηab Zc − ηac Zb, [Pa, Pb] = Zab, [ Pa, Zbc] = ηab Zc − ηac Zb. This algebra was obtained from the anti-de Sitter (AdS) algebra and a particular semigroup S by means of the S-expansion procedure introduced in Refs. [2,3]
We have shown that the Einstein–Chern– Simons (EChS) field equations have solutions that allow us to identify the energy–momentum tensor for the field ha with a negative cosmological constant
If we consider an open space (k = −1), the solutions found include (i) an accelerated expansion (α > 0) with a minimum scale factor at initial time such that, when time goes to infinity, the scale factor behaves as a hyperbolic sine function (Fig. 4), (ii) a decelerated expansion (α < 0), with a Big Crunch in a finite time tmax (Fig. 5), and (iii) a couple of solutions without accelerated expansion, whose scale factor tends to a constant value: α > 0 (Fig. 6) and α < 0 (Fig. 7)
Summary
Was found [8] that the standard five-dimensional FRW equations and some of their solutions can be obtained, in a certain limit, from the so-called Chern–Simons-FRW field equations, which are the cosmological field equations corresponding to a Chern–Simons gravity theory It is the purpose of this paper to show that the Einstein– Chern–Simons (EChS) field equations, subject to (i) the torsion-free condition (T a = 0), and (ii) the variation of the matter Lagrangian with respect to (w.r.t.) the spin connection is zero (δL M /δωab = 0), can be written in a similar way to the Einstein–Maxwell field equations.
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