Update on Overleaf.

main.tex

@@ -142,8 +142,8 @@ code-for-last-col = \color{blue}
         \pause
 		\item Fixing $|\Gamma|=8$, we have three multi-connected manifolds, up to equivalence: \pause
 		      \begin{enumerate}
-			      \item homogeneous: $N3$ and $L(8,1)$
-			      \item inhomogeneous: $N2 \equiv L(8,3)$
+			      \item homogeneous: $N3$ and $L(8,1)$.
+			      \item inhomogeneous: $N2 \equiv L(8,3)$.
 		      \end{enumerate}
         \pause
 		\item Results: inhomogeneous spaces have more variety in the CMB anisotropies than homogeneous spaces, because the strength of anisotropy suppression is observer dependent.