small changes

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Josia Pietsch 2024-01-25 12:38:52 +01:00
parent 8f800b4403
commit 0f4328f0d1
Signed by: josia
GPG key ID: E70B571D66986A2D

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@ -6,6 +6,7 @@
we have that $\Sigma^0_\xi(X) \neq \Pi^0_\xi(X)$.
\end{theorem}
\begin{proof}
\gist{%
Fix $\xi < \omega_1$.
Towards a contradiction assume $\Sigma^0_\xi(X) = \Pi^0_\xi(X)$.
By \autoref{thm:cantoruniversal},
@ -19,6 +20,10 @@
\[z \in A \iff z \in \cU_z \iff (z,z) \in \cU.\]
But by the definition of $A$,
we have $z \in A \iff (z,z) \not\in \cU \lightning$.
}{%
Let $\cU$ be $X$-universal for $\Sigma^0_\xi(X)$.
Consider $\{y \in X : (y,y) \not\in \cU\} \in \Pi^0_\xi(X) \setminus \Sigma^0_\xi(X)$.
}
\end{proof}
@ -33,8 +38,10 @@
f(B) = A.
\]
\end{definition}
\gist{%
Trivially, every Borel set is analytic.
We will see that not every analytic set is Borel.
}{}
\begin{remark}
In the definition we can replace the assertion that
$f$ is continuous
@ -64,6 +71,7 @@ We will see that not every analytic set is Borel.
\end{enumerate}
\end{theorem}
\begin{proof}
\gist{%
To show (i) $\implies$ (ii):
take $B \in \cB(Y')$
and $f\colon Y' \to X$
@ -73,11 +81,16 @@ We will see that not every analytic set is Borel.
such that $B$ is clopen with respect to the new topology.
Then let $g = f\defon{B}$
and $Y = (B, \cT\defon{B})$.
}{(i) $\implies$ (ii):
Clopenize the Borel set, then restrict.
}
(ii) $\implies$ (iii):
Any Polish space is the continuous image of $\cN$.
\gist{%
Let $g_1: \cN \to Y$
and $h \coloneqq g \circ g_1$.
}{}
(iii) $\implies$ (iv):
Let $h\colon \cN \to X$ with $h(\cN) = A$.