Quelle  appendix0.tex   Sprache: Latech

\appendix

\chapter{Appendix}
\label{sec:Appendix}

\begin{table}[htbp]
\begin{center}
\begin{tabular}{|l|l|l|}
\hline
\indexboldpos{\isasymlbrakk}{$Isabrl} &
\texttt{[|}\index{$Isabrl@\ttlbr|bold} &
\verb$\<lbrakk>$ \\
\indexboldpos{\isasymrbrakk}{$Isabrr} &
\texttt{|]}\index{$Isabrr@\ttrbr|bold} &
\verb$\<rbrakk>$ \\
\indexboldpos{\isasymImp}{$IsaImp} &
\ttindexboldpos{==>}{$IsaImp} &
\verb$\<Longrightarrow>$ \\
\isasymAnd\index{$IsaAnd@\isasymAnd|bold}&
\texttt{!!}\index{$IsaAnd@\ttAnd|bold} &
\verb$\<And>$ \\
\indexboldpos{\isasymequiv}{$IsaEq} &
\ttindexboldpos{==}{$IsaEq} &
\verb$\<equiv>$ \\
\indexboldpos{\isasymrightleftharpoons}{$IsaEqTrans} &
\ttindexboldpos{==}{$IsaEq} &
\verb$\<rightleftharpoons>$ \\
\indexboldpos{\isasymrightharpoonup}{$IsaEqTrans1} &
\ttindexboldpos{=>}{$IsaFun} &
\verb$\<rightharpoonup>$ \\
\indexboldpos{\isasymleftharpoondown}{$IsaEqTrans2} &
\ttindexboldpos{<=}{$IsaFun2} &
\verb$\<leftharpoondown>$ \\
\indexboldpos{\isasymlambda}{$Isalam} &
\texttt{\%}\indexbold{$Isalam@\texttt{\%}} &
\verb$\<lambda>$ \\
\indexboldpos{\isasymFun}{$IsaFun} &
\ttindexboldpos{=>}{$IsaFun} &
\verb$\<Rightarrow>$ \\
\indexboldpos{\isasymand}{$HOL0and} &
\texttt{\&}\indexbold{$HOL0and@{\texttt{\&}}} &
\verb$\<and>$ \\
\indexboldpos{\isasymor}{$HOL0or} &
\texttt{|}\index{$HOL0or@\ttor|bold} &
\verb$\<or>$ \\
\indexboldpos{\isasymimp}{$HOL0imp} &
\ttindexboldpos{-->}{$HOL0imp} &
\verb$\<longrightarrow>$ \\
\indexboldpos{\isasymnot}{$HOL0not} &
\verb$~$\index{$HOL0not@\verb$~$|bold} &
\verb$\<not>$ \\
\indexboldpos{\isasymnoteq}{$HOL0noteq} &
\verb$~=$\index{$HOL0noteq@\verb$~=$|bold} &
\verb$\<noteq>$ \\
\indexboldpos{\isasymforall}{$HOL0All} &
\ttindexbold{ALL}, \texttt{!}\index{$HOL0All@\ttall|bold} &
\verb$\<forall>$ \\
\indexboldpos{\isasymexists}{$HOL0Ex} &
\ttindexbold{EX}, \texttt{?}\index{$HOL0Ex@\texttt{?}|bold} &
\verb$\<exists>$ \\
\isasymuniqex\index{$HOL0ExU@\isasymuniqex|bold} &
\ttEXU\index{EXX@\ttEXU|bold}, \ttuniquex\index{$HOL0ExU@\ttuniquex|bold} &
\verb$\<exists>!$\\
\indexboldpos{\isasymepsilon}{$HOL0ExSome} &
\ttindexbold{SOME}, \isa{\at}\index{$HOL2list@\isa{\at}} &
\verb$\<epsilon>$\\
\indexboldpos{\isasymcirc}{$HOL1} &
\ttindexbold{o} &
\verb$\<circ>$\\
\indexboldpos{\isasymbar~\isasymbar}{$HOL2arithfun}&
\ttindexbold{abs}&
\verb$\<bar> \<bar>$\\
\indexboldpos{\isasymle}{$HOL2arithrel}&
\isadxboldpos{<=}{$HOL2arithrel}&
\verb$\<le>$\\
\indexboldpos{\isasymtimes}{$Isatype}&
\ttindexboldpos{*}{$HOL2arithfun} &
\verb$\<times>$\\
\indexboldpos{\isasymin}{$HOL3Set0a}&
\ttindexboldpos{:}{$HOL3Set0b} &
\verb$\<in>$\\
\isasymnotin\index{$HOL3Set0c@\isasymnotin|bold} &
\verb$~:$\index{$HOL3Set0d@\verb$~:$|bold} &
\verb$\<notin>$\\
\indexboldpos{\isasymsubseteq}{$HOL3Set0e}&
\verb$<=$ & \verb$\<subseteq>$\\
\indexboldpos{\isasymsubset}{$HOL3Set0f}&
\verb$<$ & \verb$\<subset>$\\
\indexboldpos{\isasymunion}{$HOL3Set1}&
\ttindexbold{Un} &
\verb$\<union>$\\
\indexboldpos{\isasyminter}{$HOL3Set1}&
\ttindexbold{Int} &
\verb$\<inter>$\\
\isasymUnion\index{$HOL3Set2@\isasymUnion|bold}&
\ttindexbold{UN}, \ttindexbold{Union} &
\verb$\<Union>$\\
\isasymInter\index{$HOL3Set2@\isasymInter|bold}&
\ttindexbold{INT}, \ttindexbold{Inter} &
\verb$\<Inter>$\\
\isactrlsup{\isacharasterisk}\index{$HOL4star@\isactrlsup{\isacharasterisk}|bold}&
\verb$^*$\index{$HOL4star@\verb$^$\texttt{*}|bold} &
\verb$\<^sup>*$\\
\isasyminverse\index{$HOL4inv@\isasyminverse|bold}&
\verb$^-1$\index{$HOL4inv@\verb$^-1$|bold} &
\verb$\<inverse>$\\
\hline
\end{tabular}
\end{center}
\caption{Mathematical Symbols, Their \textsc{ascii}-Equivalents and Internal Names}
\label{tab:ascii}
\end{table}\indexbold{ASCII@\textsc{ascii} symbols}

\input{appendix.tex}

\begin{table}[htbp]
\begin{center}
\begin{tabular}{@{}|lllllllll|@{}}
\hline
\texttt{ALL} &
\texttt{BIT} &
\texttt{CHR} &
\texttt{EX} &
\texttt{GREATEST} &
\texttt{INT} &
\texttt{Int} &
\texttt{LEAST} &
\texttt{O} \\
\texttt{OFCLASS} &
\texttt{PI} &
\texttt{PROP} &
\texttt{SIGMA} &
\texttt{SOME} &
\texttt{THE} &
\texttt{TYPE} &
\texttt{UN} &
\texttt{Un} \\
\texttt{WRT} &
\texttt{case} &
\texttt{choose} &
\texttt{div} &
\texttt{dvd} &
\texttt{else} &
\texttt{funcset} &
\texttt{if} &
\texttt{in} \\
\texttt{let} &
\texttt{mem} &
\texttt{mod} &
\texttt{o} &
\texttt{of} &
\texttt{op} &
\texttt{then} &&\\
\hline
\end{tabular}
\end{center}
\caption{Reserved Words in HOL Terms}
\label{tab:ReservedWords}
\end{table}


%\begin{table}[htbp]
%\begin{center}
%\begin{tabular}{|lllll|}
%\hline
%\texttt{and} &
%\texttt{binder} &
%\texttt{concl} &
%\texttt{congs} \\
%\texttt{distinct} &
%\texttt{files} &
%\texttt{in} &
%\texttt{induction} &
%\texttt{infixl} \\
%\texttt{infixr} &
%\texttt{inject} &
%\texttt{intrs} &
%\texttt{is} &
%\texttt{monos} \\
%\texttt{output} &
%\texttt{where} &
% &
% &
% \\
%\hline
%\end{tabular}
%\end{center}
%\caption{Minor Keywords in HOL Theories}
%\label{tab:keywords}
%\end{table}