+\section{Foreign Inclusion}
+
+Consider some $D$ s.t. $\patchof{D} = \bot$. $D \neq C$.
+So by Desired Contents $D \isin C \equiv D \isin L$.
+By Foreign Inclusion of $D$ in $L$, $D \isin L \equiv D \le L$.
+So $D \isin C \equiv D \le L$.
+
+xxx up to here
+
+By Tip Contents of $R^+$, $D \isin R^+ \equiv D \isin \baseof{R^+}$
+i.e. $\equiv D \isin R^-$.
+So by $\merge$, $D \isin C \equiv D \isin L$.
+
+Thus $D \isin C \equiv $
+