Fixed wrong reference.
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Bokuan Li
2026-06-28 21:30:09 -04:00
parent 8f06eca274
commit 5abdf6ab3d

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@@ -163,7 +163,7 @@
Therefore $f$ is the desired function.
Now suppose that $Y$ is an arbitrary separable metrisable space. By \autoref{lemma:admissible-approximant-existence}, there exists $\seq{I_n} \subset Y^Y$ such that:
Now suppose that $Y$ is an arbitrary separable metrisable space. By \autoref{lemma:separable-metric-space-approx-identity}, there exists $\seq{I_n} \subset Y^Y$ such that:
\begin{enumerate}[label=(\roman*)]
\item $I_n \to \text{Id}$ pointwise as $n \to \infty$.
\item For each $n \in \natp$, $I_n(Y)$ is finite and Borel measurable.