Quiescence for the exceptional Bianchi cosmologies

TL;DR

This paper investigates the asymptotic behavior of Bianchi cosmologies with orthogonal stiff fluids, revealing that type VI_{-1/9} models generally behave like types VIII and IX, with specific exceptions related to polarization and transitivity.

Contribution

It provides a comprehensive analysis of quiescent singularities in all orthogonal stiff fluid Bianchi cosmologies, especially clarifying the dynamics of type VI_{-1/9} models.

Findings

Type VI_{-1/9} cosmologies with orthogonal stiff fluids resemble types VIII and IX asymptotically.

Polarization conditions and orthogonal transitivity affect the eigenvalues of the expansion-normalized Weingarten map.

Most solutions exhibit non-negative eigenvalue limits, with exceptions in special cases.

Abstract

Cosmologies of the lower Bianchi types, i.e. except those of type VIII or IX, admit a two-dimensional Abelian subgroup of the isometry group, the $G_2$. In orthogonal perfect fluid cosmologies of all lower Bianchi types except for type VI$_{-1/9}$ the $G_2$ acts orthogonally-transitively, which is closely related to an eventual cessation of the oscillations and thus to a quiescent singularity. But due to a degeneracy in the momentum constraints, such cosmologies of type VI$_{-1/9}$ do not necessarily have this property. As a consequence, the dynamics of type VI$_{-1/9}$ orthogonal perfect fluid cosmologies have the same degrees of freedom as those of the higher types VIII and IX and their dynamics are expected to be markedly different compared to those of the other lower Bianchi types. In this article we take a different approach to quiescence, namely the presence of an orthogonal stiff fluid. On the one hand, this completes the analysis of the initial singularity for all Bianchi orthogonal stiff fluid cosmologies. On the other hand, this allows us to get a grasp of the underlying dynamics of type VI$_{-1/9}$ perfect fluid cosmologies, in particular the effect of orthogonal transitivity as well as possible (asymptotic) polarization conditions. In particular, we show that a generic type VI$_{-1/9}$ cosmology with an orthogonal stiff fluid has similar asymptotics as a generic Bianchi type VIII or IX cosmology with an orthogonal stiff fluid. The only exceptions to this genericity are solutions satisfying (asymptotic) polarization conditions, and solutions for which the $G_2$ acts orthogonally-transitively. Only in those cases may the limits of the eigenvalues of the expansion-normalized Weingarten map be negative.