Cosmic topology. Part Ic. Limits on lens spaces from circle searches

TL;DR

This paper uses CMB circle searches to place new, stronger constraints on the possible lens space topologies of the universe, depending on its curvature scale, improving upon previous limits.

Contribution

It introduces a method to constrain lens space topologies using absence of matching circles in CMB data, providing tighter bounds than earlier studies.

Findings

Constraints on p and q depend on curvature scale.

For |Ω_K| ≈ 0.05, p ≤ 9.

For |Ω_K| ≈ 0.02, p ≤ 24.

Abstract

Cosmic microwave background (CMB) temperature and polarization observations indicate that in the best-fit $\Lambda$ Cold Dark Matter model of the Universe, the local geometry is consistent with at most a small amount of positive or negative curvature, i.e., $\vert\Omega_K\vert\ll1$. However, whether the geometry is flat ($E^3$), positively curved ($S^3$) or negatively curved ($H^3$), there are many possible topologies. Among the topologies of $S^3$ geometry, the lens spaces $L(p,q)$, where $p$ and $q$ ($p>1$ and $0<q<p$) are positive integers, are quotients of the covering space of $S^3$ (the three-sphere) by ${\mathbb{Z}}_p$, the cyclic group of order $p$. We use the absence of any pair of circles on the CMB sky with matching patterns of temperature fluctuations to establish constraints on $p$ and $q$ as a function of the curvature scale that are considerably stronger than those previously asserted for most values of $p$ and $q$. The smaller the value of $\vert\Omega_K\vert$, i.e., the larger the curvature radius, the larger the maximum allowed value of $p$. For example, if $\vert\Omega_K\vert\simeq 0.05$ then $p\leq 9 $, while if $\vert\Omega_K\vert\simeq 0.02$, $p$ can be as high as 24. Future work will extend these constraints to a wider set of $S^{3}$ topologies.