capitalise a few names

[topbloke-formulae.git] / article.tex

diff --git a/article.tex b/article.tex
index 5459b88726b9e2264e74bd0261cd67bc54ae34b3..0f1a24b9b723f69d3453e2eb73d3beab51154029 100644 (file)
--- a/article.tex
+++ b/article.tex
@@ -559,7 +559,7 @@ That is, $\baseof{C} = R$.
 
 $\qed$
 
-\subsection{Coherence and patch inclusion}
+\subsection{Coherence and Patch Inclusion}
 
 Need to determine $C \haspatch \p$ based on $L,M,R \haspatch \p$.
 This involves considering $D \in \py$.  
@@ -647,13 +647,13 @@ R$.  And $D \neq C$.  So $D \not\isin C$.  $\qed$
 
 We need worry only about $C \in \py$.  
 And $\patchof{C} = \patchof{L}$
-so $L \in \py$ so $L \haspatch \p$.  We will use the unique base,
-and coherence and patch inclusion, of $C$ as just proved.
+so $L \in \py$ so $L \haspatch \p$.  We will use the Unique Base
+of $C$, and its Coherence and Patch Inclusion, as just proved.
 
 Firstly we show $C \haspatch \p$: If $R \in \py$, then $R \haspatch
-\p$ and by coherence/inclusion $C \haspatch \p$ .  If $R \not\in \py$
+\p$ and by Coherence/Inclusion $C \haspatch \p$ .  If $R \not\in \py$
 then by Tip Merge $M = \baseof{L}$ so by Base Acyclic and definition
-of $\nothaspatch$, $M \nothaspatch \p$.  So by coherence/inclusion $C
+of $\nothaspatch$, $M \nothaspatch \p$.  So by Coherence/Inclusion $C
 \haspatch \p$ (whether $R \haspatch \p$ or $\nothaspatch$).
 
 We will consider some $D$ and prove the Exclusive Tip Contents form.