LCH typo fix?
This commit is contained in:
@@ -165,15 +165,14 @@
|
|||||||
\begin{proof}
|
\begin{proof}
|
||||||
$(\bracs{F_E}_{E \in \ce})$: For each $E \in \ce$, $\bracsn{F \in \ce|F \cap \ol E \ne \emptyset}$ is finite by \autoref{lemma:locally-finite-compact}. Let
|
$(\bracs{F_E}_{E \in \ce})$: For each $E \in \ce$, $\bracsn{F \in \ce|F \cap \ol E \ne \emptyset}$ is finite by \autoref{lemma:locally-finite-compact}. Let
|
||||||
\[
|
\[
|
||||||
F_E = \bigcup_{\substack{F \in \ce} \\ F \cap \ol E \ne \emptyset}F
|
F_E = \bigcup_{\substack{F \in \ce \\ F \cap \ol E \ne \emptyset}}F
|
||||||
\]
|
\]
|
||||||
|
|
||||||
then $F_E \in \cn(\ol{E})$ is relatively compact.
|
then $F_E \in \cn(\ol{E})$ is relatively compact.
|
||||||
|
|
||||||
Let $N \subset X$ and $E \in \ce$. If $N \cap F_E \ne \emptyset$, then there exists $F \in \ce$ such that $N \cap F \ne \emptyset$ and $F \cap \ol{E} \ne \emptyset$. Thus
|
Let $N \subset X$ and $E \in \ce$. If $N \cap F_E \ne \emptyset$, then there exists $F \in \ce$ such that $N \cap F \ne \emptyset$ and $F \cap \ol{E} \ne \emptyset$. Thus
|
||||||
\begin{align*}
|
\begin{align*}
|
||||||
\bracs{E \in \ce|N \cap F_E \ne \emptyset} &\subset \bigcup_{\substack{F \in \ce \\ F \cap N \ne \emptyset}}\bracs{E \in \ce|F \cap \ol{E} \ne \emptyset} \\
|
\bracs{E \in \ce|N \cap F_E \ne \emptyset} &\subset \bigcup_{\substack{F \in \ce \\ F \cap N \ne \emptyset}}\bracs{E \in \ce|F \cap \ol{E} \ne \emptyset}
|
||||||
&\subset \bigcup_{\substack{F \in \ce \\ F \cap N \ne \emptyset}}\bracs{E \in \ce|\ol{F} \cap \ol{E} \ne \emptyset}
|
|
||||||
\end{align*}
|
\end{align*}
|
||||||
|
|
||||||
|
|
||||||
|
|||||||
Reference in New Issue
Block a user