1
Fork 0
This commit is contained in:
prescientmoon 2025-03-21 13:56:43 +01:00
commit b23127a84b
Signed by: prescientmoon
SSH key fingerprint: SHA256:UUF9JT2s8Xfyv76b8ZuVL7XrmimH4o49p4b+iexbVH4

View file

@ -121,7 +121,7 @@ code-for-last-col = \color{blue}
\begin{frame}[fragile]{Homogenous Spherical Spaces --- Results} \begin{frame}[fragile]{Homogenous Spherical Spaces --- Results}
\begin{itemize} \begin{itemize}
\pause \pause
\item For the majority of groups $\Gamma$, the anisotropies $\frac{\delta T}{T}$ do not coincide with observations. \item For the majority of groups $\Gamma$, the anisotropies $\textcolor{purple}{\frac{\delta T}{T}}$ do not coincide with observations.
\pause \pause
\item The only groups for which they do are $\Gamma = O^*$ and $\Gamma = I^*$ — the \textcolor{red}{binary octahedral} and \textcolor{red}{binary icosahedral} groups of order 48 and 120 respectively. \item The only groups for which they do are $\Gamma = O^*$ and $\Gamma = I^*$ — the \textcolor{red}{binary octahedral} and \textcolor{red}{binary icosahedral} groups of order 48 and 120 respectively.
\pause \pause
@ -236,7 +236,7 @@ code-for-last-col = \color{blue}
\begin{frame}{Conclusion} \begin{frame}{Conclusion}
\pause \pause
\begin{enumerate} \begin{enumerate}
\item We can infer the shape of the universe from its spectrum. \item We can infer the \textcolor{blue}{shape} of the universe from its \textcolor{blue}{spectrum}.
\pause \pause
\item There are two homogeneous spherical manifolds obtained as $\S^3/\Gamma$ which produce CMB similar to observations. \item There are two homogeneous spherical manifolds obtained as $\S^3/\Gamma$ which produce CMB similar to observations.
@ -245,7 +245,7 @@ code-for-last-col = \color{blue}
\item Inhomogeneous spherical spaces exhibit varied behavior of CMB anisotropies. \item Inhomogeneous spherical spaces exhibit varied behavior of CMB anisotropies.
\pause \pause
\item Statistical test results suggest possibilities of finite multi-connected topology. \item Statistical test results suggest possibilities of \textcolor{red}{finite multi-connected} topology.
\end{enumerate} \end{enumerate}
\end{frame} \end{frame}