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Josia Pietsch 2024-02-07 13:18:14 +01:00
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2 changed files with 14 additions and 1 deletions

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@ -273,6 +273,7 @@ Recall:
A limit of distal flows is distal.
\end{proposition}
\begin{proof}
\gist{%
Let $(X,T)$ be a limit of $\Sigma = \{(X_i, T) : i \in I\}$.
Suppose that each $(X_i, T)$ is distal.
If $(X,T)$ was not distal,
@ -283,4 +284,7 @@ Recall:
But then $g_n \pi_i(x_1) \to \pi_i(z)$
and $g_n \pi_i(x_2) \to \pi_i(z)$,
which is a contradiction since $(X_i, T)$ is distal.
}{Suppose there is a proximal pair $x_1,x_2$.
Take $i$ such that $\pi_i(x_1) \neq \pi_i(x_2) \lightning$.
}
\end{proof}

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@ -17,7 +17,7 @@ $X$ is always compact metrizable.
% and $h\colon x \mapsto x + \alpha$.\footnote{Again $x + \alpha$ denotes $x \cdot \alpha$ in $\C$.}
% \end{example}
\begin{proof}
% TODO TODO TODO Think!
\gist{%
The action of $1$ determines $h$.
Consider
\[
@ -82,6 +82,15 @@ $X$ is always compact metrizable.
For $\alpha = h$ we get that
a flow $\Z \acts X$ corresponds to $\Z \acts K$
with $(1,x) \mapsto x + \alpha$.
}{
\begin{itemize}
\item $G \coloneqq \overline{\{h^n : n \in \Z\} } \subseteq \cC(X,X)$.
\item $G$ is compact (Arzela-Ascoli), abelian topological group (closure of ab. top. group)
\item Take any $x \in G$.
\item $Gx$ is compact (since $g \mapsto gx$ is continuous and $G$ is compact)
\item Stabilizer $G_x$ is closed. $K \coloneqq \faktor{G}{G_x}$, $K \to X, fG_x \mapsto f(x)$.
\end{itemize}
}
\end{proof}
\begin{definition}
Let $(X,T)$ be a flow