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9 changed files with 14 additions and 126 deletions

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@ -197,7 +197,8 @@
Let $X \neq \emptyset$ be a Polish space.
Then there is a closed subset
\[
D \subseteq \N^\N \mathbin{\text{\reflectbox{$\coloneqq$}}} \cN
D \subseteq \N^\N \text{\reflectbox{$\coloneqq$}} \cN
% TODO correct N for the Baire space?
\]
and a continuous bijection from
$D$ onto $X$ (the inverse does not need to be continuous).
@ -238,7 +239,7 @@
\end{enumerate}
\gist{%
Suppose we already have $F_s \mathbin{\text{\reflectbox{$\coloneqq$}}} F$.
Suppose we already have $F_s \text{\reflectbox{$\coloneqq$}} F$.
We need to construct a partition $(F_i)_{i \in \N}$
of $F$ with $\overline{F_i} \subseteq F$
and $\diam(F_i) < \epsilon$

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@ -62,7 +62,7 @@
We extend $f$ to $g\colon\cN \to X$
in the following way:
Take $S \coloneqq \{s \in \N^{<\N}: \exists x \in D, n \in \N.~x\defon{n} = s\}$.
Take $S \coloneqq \{s \in \N^{<\N}: \exists x \in D, n \in \N.~x=s\defon{n}\}$.
Clearly $S$ is a pruned tree.
Moreover, since $D$ is closed, we have that (cf.~\yaref{s3e1})
\[

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@ -4,7 +4,6 @@
If $C$ is coanalytic,
then there exists a $\Pi^1_1$-rank on $C$.
\end{theorem}
% TODO show that WO sse 2^QQ is Pi_1^1 complete
\begin{proof}
\gist{%
Pick a $\Pi^1_1$-complete set.
@ -26,7 +25,7 @@
% \arrow["\subseteq"', hook, from=2-3, to=1-3]
% \end{tikzcd}
Let $X = 2^{\Q} \supseteq \WO$.
We have already shown that $\WO$ is $\Pi^1_1$-complete.% TODO REF
We have already show that $\WO$ is $\Pi^1_1$-complete.
Set $\phi(x) \coloneqq \otp(x)$
($\otp\colon \WO \to \Ord$ denotes the order type).

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@ -175,7 +175,7 @@ Recall:
Let $(T,X)$ and $(T,Y)$ be flows.
A \vocab{factor map} $\pi\colon (T,X) \to (T,Y)$
is a continuous surjection $X \twoheadrightarrow Y$
that is $T$-equivariant,
commuting with the group action,
i.e.~$\forall t \in T, x \in X.~\pi(t\cdot x) = t\cdot \pi(x)$.
If such a factor map exists,
we also say that $(T,Y)$ is a \vocab{factor}
@ -258,14 +258,13 @@ Recall:
\begin{definition}
Let $\Sigma = \{(X_i, T) : i \in I\} $
be a collection of factors of $(X,T)$.
Let $\pi_i\colon (X,T) \to (X_i, T)$ denote the factor map.
Then $(X, T)$ is a \vocab{limit}%
\footnote{This is not a limit in the category theory sense and not uniquely determined.}
of $\Sigma$
Let $\pi_i\colon (X,T) \to (X_i, T)$ denote the factor maps.
Then $(X, T)$ is the \vocab{limit} of $\Sigma$
iff
\[
\forall x_1,x_2 \in X.~\exists i \in I.~\pi_i(x_1) \neq \pi_i(x_2).
\]
% TODO think about abstract nonsense
\end{definition}
\begin{proposition}

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@ -65,9 +65,9 @@ equicontinuity coincide.
\end{tikzcd}\]
\end{theorem}
\begin{proof}
% TODO Think about this
We want to apply Zorn's lemma.
If suffices to show that isometric flows are closed under inverse limits,%
\footnote{This seems to be an inverse limit in the category theory sense.}
If suffices to show that isometric flows are closed under inverse limits,
i.e.~if $(Y_\alpha, f_{\alpha,\beta})$,
$\beta < \alpha \le \Theta$
are isometric, then the inverse limit $Y$ is isometric.%

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@ -34,9 +34,6 @@
\end{enumerate}
\nr 2
Recall \yaref{thm:clopenize}:
\begin{fact}
Let $(X,\tau)$ be a Polish space and
$A \in \cB(X)$.
@ -44,10 +41,10 @@ Recall \yaref{thm:clopenize}:
with the same Borel sets as $\tau$
such that $A$ is clopen.
\end{fact}
(Do it for $A$ closed,
then show that the sets which work
form a $\sigma$-algebra).
\end{fact}
\begin{enumerate}[(a)]
\item Let $(X, \tau)$ be Polish.

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@ -11,26 +11,6 @@
\nr 3
% somewhat examinable (for 1.0)
% TODO
\begin{enumerate}[(a)]
\item $(X,T)$ is distal iff it does not have a proximal pair,
i.e.~$a\neq b$, $c$ such that $t_n \in T$,
$t_na, t_nb \to c$.
Equivalently,
for all $a,b$ there exists an $\epsilon$,
such that for all $t \in T$, $d(ta,tb) > \epsilon$.
\item % TODO (not too hard)
% (b)
% Let $(X,T)$ be distal with a dense orbit,
% then it is distal minimal.
% Sheet 8: has dense orbit is Borel
% Distal flow decomposes into distal minimal flows.
\end{enumerate}
\nr 4

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@ -1,87 +0,0 @@
\tutorial{15}{2024-01-31}{Additions}
\subsection{Additional Tutorial}
The following is not relevant for the exam,
but gives a more general picture.
Let $ X$ be a topological space.
Let $\cF$ be a filter on $ X$.
$x \in X$ is a limit point of $\cF$ iff the neighbourhood filter $\cN_x$,
all sets containing an open neighbourhood of $x$,
is contained in $\cF$.
\begin{fact}
$X$ is Hausdorff iff every filter has at most one limit point.
\end{fact}
\begin{proof}
Neighbourhood filters are compatible
iff the corresponding points
can not be separated by open subsets.
\end{proof}
\begin{fact}
$X$ is (quasi-) compact
iff every ultrafilter converges.
\end{fact}
\begin{proof}
Suppose that $X$ is compact.
Let $\cU$ be an ultrafilter.
Consider the family $\cV = \{\overline{A} : A \in \cU\}$
of closed sets.
By the FIP we geht that there exist
$c \in X$ such that $c \in \overline{A}$ for all $A \in \cU$.
Let $N$ be an open neighbourhood of $c$.
If $N^c \in \cU$, then $c \in N^c \lightning$
So we get that $N \in \cU$.
Let $\{V_i : i \in I\} $ be a family of closed sets with the FIP.
Consider the filter generated by this family.
We extend this to an ultrafilter.
The limit of this ultrafilter is contained in all the $V_i$.
\end{proof}
Let $X,Y$ be topological spaces,
$\cB$ a filter base on $X$,
$\cF$ the filter generated by $\cB$
and
$f\colon X \to Y$.
Then $f(\cB)$ is a filter base on $Y$,
since $f(\bigcap A_i ) \subseteq \bigcap f(A_i)$.
We say that $\lim_\cF f = y$,
if $f(\cF) \to y$.
Equivalently $f^{-1}(N) \in \cF$
for all neighbourhoods $N$ of $y$.
In the lecture we only considered $X = \N$.
If $\cB$ is the base of an ultrafilter,
so is $f(\cB)$.
\begin{fact}
Let $X$ be a topological space
and let $Y$ be Hausdorff.
Let $f,g \colon X \to Y$
be continuous.
Let $A \subseteq X$ be dense such that
$f\defon{A} = g\defon{A} $.
Then $f = g$.
\end{fact}
\begin{proof}
Consider $(f,g)^{-1}(\Delta) \supseteq A$.
\end{proof}
We can uniquely extend $f\colon X \to Y$ continuous
to a continuous $\overline{f}\colon \beta X \to Y$
by setting $\overline{f}(\cU) \coloneqq \lim_\cU f$.
Let $V$ be an open neighbourhood of $Y$ in $\overline{f}\left( U) \right) $.
Consider $f^{-1}(V)$.
Consider the basic open set
\[
\{\cF \in \beta\N : \cF \ni f^{-1}(V)\}.
\]

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@ -74,7 +74,6 @@
\input{inputs/tutorial_12b}
\input{inputs/tutorial_12}
\input{inputs/tutorial_14}
\input{inputs/tutorial_15}
\section{Facts}
\input{inputs/facts}