Try to add {} around all lstinline in tables, except if only first - …

…or already present.

chapters/arrays.tex

@@ -70,12 +70,12 @@ \section{Array Declarations}\label{array-declarations}
 \tablehead{Modelica form 1} & \tablehead{Modelica form 2} & \tablehead{\# dims} & \tablehead{Designation} & \tablehead{Explanation}\\
 \hline
 \hline
-\lstinline!C x!;            & \lstinline!C x!; & $0$ & Scalar & Scalar\\
-\lstinline!C[$n$] x;!       & \lstinline!C x[$n$];! & $1$ & Vector & $n$-vector\\
-\lstinline!C[EB] x;!        & \lstinline!C x[EB]! & $1$ & Vector & Vector indexed by \lstinline!EB!\\
-\lstinline!C[$n$, $m$] x;!  & \lstinline!C x[$n$, $m$];! & $2$ & Matrix & $n \times m$ matrix\\
-\lstinline!C[$n_1$, $n_{2}$, $\ldots$, $n_k$] x;! &
-\lstinline!C x[$n_{1}$, $n_{2}$, $\ldots$, $n_{k}$];! & $k$ & Array & General array\\
+{\lstinline!C x!};            & {\lstinline!C x!}; & $0$ & Scalar & Scalar\\
+{\lstinline!C[$n$] x;!}       & {\lstinline!C x[$n$];!} & $1$ & Vector & $n$-vector\\
+{\lstinline!C[EB] x;!}        & {\lstinline!C x[EB]!} & $1$ & Vector & Vector indexed by {\lstinlineEB!}\\
+{\lstinline!C[$n$, $m$] x;!}  & {\lstinline!C x[$n$, $m$];!} & $2$ & Matrix & $n \times m$ matrix\\
+{\lstinline!C[$n_1$, $n_{2}$, $\ldots$, $n_k$] x;!} &
+{\lstinline!C x[$n_{1}$, $n_{2}$, $\ldots$, $n_{k}$];!} & $k$ & Array & General array\\
 \hline
 \end{tabular}
 \end{center}
@@ -137,10 +137,10 @@ \section{Array Declarations}\label{array-declarations}
 \tablehead{Modelica form 1} & \tablehead{Modelica form 2} & \tablehead{\# dims} & \tablehead{Designation} & \tablehead{Explanation}\\
 \hline
 \hline
-\lstinline!C[1] x;!      & \lstinline!C x[1];!      & $1$ & Vector & 1-vector, representing a scalar\\
-\lstinline!C[1, 1] x;!   & \lstinline!C x[1, 1];!   & $2$ & Matrix & $(1 \times 1)$-matrix, representing a scalar\\
-\lstinline!C[$n$, 1] x;! & \lstinline!C x[$n$, 1];! & $2$ & Matrix & $(n \times 1)$-matrix, representing a column\\
-\lstinline!C[1, $n$] x;! & \lstinline!C x[1, $n$];! & $2$ & Matrix & $(1 \times n)$-matrix, representing a row\\
+{\lstinline!C[1] x;!}      & {\lstinline1C x[1];!}      & $1$ & Vector & 1-vector, representing a scalar\\
+{\lstinline!C[1, 1] x;!}   & {\lstinline!C x[1, 1];!}   & $2$ & Matrix & $(1 \times 1)$-matrix, representing a scalar\\
+{\lstinline!C[$n$, 1] x;!} & {\lstinline!C x[$n$, 1];!} & $2$ & Matrix & $(n \times 1)$-matrix, representing a column\\
+{\lstinline!C[1, $n$] x;!} & {\lstinline!C x[1, $n$];!} & $2$ & Matrix & $(1 \times n)$-matrix, representing a row\\
 \hline
 \end{tabular}
 \end{center}
@@ -601,10 +601,10 @@ \subsubsection{Reduction Expressions}\label{reduction-expressions}
 \tablehead{Reduction} & \tablehead{Restriction on \lstinline!expression1!} & \tablehead{Result for empty \lstinline!expression2!}\\
 \hline
 \hline
-\lstinline!sum! & \lstinline!Integer! or \lstinline!Real! & \lstinline!zeros($\ldots$)!\\
-\lstinline!product! & Scalar \lstinline!Integer! or \lstinline!Real! & 1\\
-\lstinline!min! & Scalar enumeration, \lstinline!Boolean!, \lstinline!Integer! or \lstinline!Real! & Greatest value of type\\
-\lstinline!max! & Scalar enumeration, \lstinline!Boolean!, \lstinline!Integer! or \lstinline!Real! & Least value of type\\
+{\lstinline!sum!} & {\lstinline!Integer!} or {\lstinline!Real!} & {\lstinline!zeros($\ldots$)!}\\
+{\lstinline!product!} & Scalar {\lstinline!Integer!} or {\lstinline!Real!} & 1\\
+{\lstinline!min!} & Scalar enumeration, {\lstinline!Boolean!}, {\lstinline!Integer!} or {\lstinline!Real!} & Greatest value of type\\
+{\lstinline!max!} & Scalar enumeration, {\lstinline!Boolean!}, {\lstinline!Integer!} or {\lstinline!Real!} & Least value of type\\
 \hline
 \end{tabular}
 \end{center}
@@ -630,11 +630,11 @@ \subsection{Matrix and Vector Algebra Functions}\label{matrix-and-vector-algebra
 \tablehead{Expression} & \tablehead{Description} & \tablehead{Details}\\
 \hline
 \hline
-\lstinline!transpose($A$)! & Matrix transpose & \Cref{modelica:transpose} \\
-\lstinline!outerProduct($x$, $y$)! & Vector outer product & \Cref{modelica:outerProduct} \\
-\lstinline!symmetric($A$)! & Symmetric matrix, keeping upper part & \Cref{modelica:symmetric} \\
-\lstinline!cross($x$, $y$)! & Cross product & \Cref{modelica:cross} \\
-\lstinline!skew($x$)! & Skew symmetric matrix associated with vector & \Cref{modelica:skew} \\
+{\lstinline!transpose($A$)!} & Matrix transpose & \Cref{modelica:transpose} \\
+{\lstinline!outerProduct($x$, $y$)!} & Vector outer product & \Cref{modelica:outerProduct} \\
+{\lstinline!symmetric($A$)!} & Symmetric matrix, keeping upper part & \Cref{modelica:symmetric} \\
+{\lstinline!cross($x$, $y$)!} & Cross product & \Cref{modelica:cross} \\
+{\lstinline!skew($x$)!} & Skew symmetric matrix associated with vector & \Cref{modelica:skew} \\
 \hline
 \end{tabular}
 \end{center}
@@ -994,17 +994,17 @@ \section{Indexing}\label{array-indexing}\label{indexing}
 \tablehead{Expression} & \tablehead{\# dims} & \tablehead{Description}\\
 \hline
 \hline
-\lstinline!x[1, 1]!                     & 0 & Scalar\\
-\lstinline!x[:, 1]!                     & 1 & $n$-vector\\
-\lstinline!x[1, :]! or \lstinline!x[1]! & 1 & $m$-vector\\
-\lstinline!v[1:$p$]!                    & 1 & $p$-vector\\
-\lstinline!x[1:$p$, :]!                 & 2 & $p \times m$ matrix\\
-\lstinline!x[1:1, :]!                   & 2 & $1 \times m$ ``row'' matrix\\
-\lstinline!x[{1, 3, 5}, :]!             & 2 & $3 \times m$ matrix\\
-\lstinline!x[:, v]!                     & 2 & $n \times k$ matrix\\
-\lstinline!z[:, 3, :]!                  & 2 & $i \times p$ matrix\\
-\lstinline!x[scalar([1]), :]!           & 1 & $m$-vector\\
-\lstinline!x[vector([1]), :]!           & 2 & $1 \times m$ ``row'' matrix\\
+{\lstinline!x[1, 1]!}                     & 0 & Scalar\\
+{\lstinline!x[:, 1]!}                     & 1 & $n$-vector\\
+{\lstinline!x[1, :]!} or {\lstinline!x[1]!} & 1 & $m$-vector\\
+{\lstinline!v[1:$p$]!}                    & 1 & $p$-vector\\
+{\lstinline!x[1:$p$, :]!}                 & 2 & $p \times m$ matrix\\
+{\lstinline!x[1:1, :]!}                   & 2 & $1 \times m$ ``row'' matrix\\
+{\lstinline!x[{1, 3, 5}, :]!}             & 2 & $3 \times m$ matrix\\
+{\lstinline!x[:, v]!}                     & 2 & $n \times k$ matrix\\
+{\lstinline!z[:, 3, :]!}                  & 2 & $i \times p$ matrix\\
+{\lstinline!x[scalar([1]), :]!}           & 1 & $m$-vector\\
+{\lstinline!x[vector([1]), :]!}           & 2 & $1 \times m$ ``row'' matrix\\
 \hline
 \end{tabular}
 \end{center}
@@ -1098,10 +1098,10 @@ \subsection{Addition, Subtraction, and String Concatenation}\label{array-element
 \tablehead{Operation} \lstinline!c := a $\pm$ b!\\
 \hline
 \hline
-Scalar & Scalar & Scalar & \lstinline!c := a $\pm$ b!\\
-$n$-vector & $n$-vector & $n$-vector & \lstinline!c[$j$] := a[$j$] $\pm$ b[$j$]!\\
-$n \times m$ matrix & $n \times m$ matrix & $n \times m$ matrix & \lstinline!c[$j$, $k$] := a[$j$, $k$] $\pm$ b[$j$, $k$]!\\
-$n \times m \times \ldots$ & $n \times m \times \ldots$ & $n \times m \times \ldots$ & \lstinline!c[$j$, $k$, $\ldots$] := a[$j$, $k$, $\ldots$] $\pm$ b[$j$, $k$, $\ldots$]!\\
+Scalar & Scalar & Scalar & {\lstinline!c := a $\pm$ b!}\\
+$n$-vector & $n$-vector & $n$-vector & {\lstinline!c[$j$] := a[$j$] $\pm$ b[$j$]!}\\
+$n \times m$ matrix & $n \times m$ matrix & $n \times m$ matrix & {\lstinline!c[$j$, $k$] := a[$j$, $k$] $\pm$ b[$j$, $k$]!}\\
+$n \times m \times \ldots$ & $n \times m \times \ldots$ & $n \times m \times \ldots$ & {\lstinline!c[$j$, $k$, $\ldots$] := a[$j$, $k$, $\ldots$] $\pm$ b[$j$, $k$, $\ldots$]!}\\
 \hline
 \end{tabular}
 \end{center}
@@ -1121,10 +1121,10 @@ \subsection{Addition, Subtraction, and String Concatenation}\label{array-element
 & \tablehead{Operation \lstinline!c := a .$\pm$ b!}\\
 \hline
 \hline
-Scalar & Scalar & Scalar & \lstinline!c := a $\pm$ b!\\
-Scalar & $n \times m \times \ldots$ & $n \times m \times \ldots$ & \lstinline!c[$j$, $k$, $\ldots$] := a $\pm$ b[$j$, $k$, $\ldots$]!\\
-$n \times m \times \ldots$ & Scalar & $n \times m \times \ldots$ & \lstinline!c[$j$, $k$, $\ldots$] := a[$j$, $k$, $\ldots$] $\pm$ b!\\
-$n \times m \times \ldots$ & $n \times m \times \ldots$ & $n \times m \times \ldots$ & \lstinline!c[$j$, $k$, $\ldots$] := a[$j$, $k$, $\ldots$] $\pm$ b[$j$, $k$, $\ldots$]!\\
+Scalar & Scalar & Scalar & {\lstinline!c := a $\pm$ b!}\\
+Scalar & $n \times m \times \ldots$ & $n \times m \times \ldots$ & {\lstinline!c[$j$, $k$, $\ldots$] := a $\pm$ b[$j$, $k$, $\ldots$]!}\\
+$n \times m \times \ldots$ & Scalar & $n \times m \times \ldots$ & {\lstinline!c[$j$, $k$, $\ldots$] := a[$j$, $k$, $\ldots$] $\pm$ b!}\\
+$n \times m \times \ldots$ & $n \times m \times \ldots$ & $n \times m \times \ldots$ & {\lstinline!c[$j$, $k$, $\ldots$] := a[$j$, $k$, $\ldots$] $\pm$ b[$j$, $k$, $\ldots$]!}\\
 \hline
 \end{tabular}
 \end{center}
@@ -1140,8 +1140,8 @@ \subsection{Addition, Subtraction, and String Concatenation}\label{array-element
 \tablehead{Operation} \lstinline!c := $\pm$ a!\\
 \hline
 \hline
-Scalar & Scalar & \lstinline!c := $\pm$ a!\\
-$n \times m \times \ldots$ & $n \times m \times \ldots$ & \lstinline!c[$j$, $k$, $\ldots$] := $\pm$ a[$j$, $k$, $\ldots$]!\\
+Scalar & Scalar & {\lstinline!c := $\pm$ a!}\\
+$n \times m \times \ldots$ & $n \times m \times \ldots$ & {\lstinline!c[$j$, $k$, $\ldots$] := $\pm$ a[$j$, $k$, $\ldots$]!}\\
 \hline
 \end{tabular}
 \end{center}

chapters/functions.tex

@@ -2005,11 +2005,11 @@ \subsubsection{Simple Types}\label{simple-types}
                                          & \multicolumn{1}{c}{\tablehead{Input}} & \multicolumn{1}{c}{\tablehead{Output}}\\
 \hline
 \hline
-\lstinline!Real! & \lstinline[language=C]!double! & \lstinline[language=C]!double *!\\
-\lstinline!Integer! & \lstinline[language=C]!int! & \lstinline[language=C]!int *!\\
-\lstinline!Boolean! & \lstinline[language=C]!int! & \lstinline[language=C]!int *!\\
-\lstinline!String! & \lstinline[language=C]!const char *! & \lstinline[language=C]!const char **!\\
-Enumeration type & \lstinline[language=C]!int! & \lstinline[language=C]!int *!\\
+{\lstinline!Real!} & {\lstinline[language=C]!double!} & {\lstinline[language=C]!double *!}\\
+{\lstinline!Integer!} & {\lstinline[language=C]!int!} & {\lstinline[language=C]!int *!}\\
+{\lstinline!Boolean!} & {\lstinline[language=C]!}int!} & \lstinline[language=C]!}int *!}\\
+{\lstinline!String!} & {\lstinline[language=C]!const char *!} & \lstinline[language=C]!const char **!}\\
+Enumeration type & {\lstinline[language=C]!int!} & \lstinline[language=C]!int *!}\\
 \hline
 \end{tabular}
 \end{center}
@@ -2044,11 +2044,11 @@ \subsubsection{Simple Types}\label{simple-types}
                                          & \multicolumn{1}{c}{\tablehead{Input}} & \multicolumn{1}{c}{\tablehead{Output}}\\
 \hline
 \hline
-\lstinline!Real! & \lstinline[language=FORTRAN77]!DOUBLE PRECISION! & \lstinline[language=FORTRAN77]!DOUBLE PRECISION!\\
-\lstinline!Integer! & \lstinline[language=FORTRAN77]!INTEGER! & \lstinline[language=FORTRAN77]!INTEGER!\\
-\lstinline!Boolean! & \lstinline[language=FORTRAN77]!LOGICAL! & \lstinline[language=FORTRAN77]!LOGICAL!\\
-\lstinline!String! & \emph{Special} & \emph{Not available}\\
-Enumeration type & \lstinline[language=FORTRAN77]!INTEGER! & \lstinline[language=FORTRAN77]!INTEGER!\\
+{\lstinline!}Real!} & {\lstinline[language=FORTRAN77]!DOUBLE PRECISION!} & {\lstinline[language=FORTRAN77]!DOUBLE PRECISION!}\\
+{\lstinline!}Integer!} & {\lstinline[language=FORTRAN77]!INTEGER!} & {\lstinline[language=FORTRAN77]!INTEGER!}\\
+{\lstinline!}Boolean!} & {\lstinline[language=FORTRAN77]!LOGICAL!} & {\lstinline[language=FORTRAN77]!LOGICAL!}\\
+{\lstinline!}String!} & \emph{Special} & \emph{Not available}\\
+Enumeration type & {\lstinline[language=FORTRAN77]!INTEGER!} & {\lstinline[language=FORTRAN77]!INTEGER!}\\
 \hline
 \end{tabular}
 \end{center}
@@ -2277,12 +2277,12 @@ \subsection{Return Type Mapping}\label{return-type-mapping}
 \multicolumn{1}{c|}{\tablehead{Modelica}} & \multicolumn{1}{c|}{\tablehead{C}} & \multicolumn{1}{c}{\tablehead{FORTRAN~77}}\\
 \hline
 \hline
-\lstinline!Real!    & \lstinline[language=C]!double!      & \lstinline[language=FORTRAN77]!DOUBLE PRECISION!\\
-\lstinline!Integer! & \lstinline[language=C]!int!         & \lstinline[language=FORTRAN77]!INTEGER!\\
-\lstinline!Boolean! & \lstinline[language=C]!int!         & \lstinline[language=FORTRAN77]!LOGICAL!\\
-\lstinline!String!  & \lstinline[language=C]!const char*! & \emph{Not allowed}\\
-\lstinline!T[$\mathit{dim}_{1}$, $\ldots$, $\mathit{dim}_{n}$]! & \emph{Not allowed} & \emph{Not allowed} \\
-Enumeration type    & \lstinline[language=C]!int!         & \lstinline[language=FORTRAN77]!INTEGER!\\
+{\lstinline!Real!}    & {\lstinline[language=C]!double!}      & {\lstinline[language=FORTRAN77]!DOUBLE PRECISION!}\\
+{\lstinline!Integer!} & {\lstinline[language=C]!int!}         & {\lstinline[language=FORTRAN77]!INTEGER!}\\
+{\lstinline!Boolean!} & {\lstinline[language=C]!int!}         & {\lstinline[language=FORTRAN77]!LOGICAL!}\\
+{\lstinline!String!}  & {\lstinline[language=C]!const char*!} & \emph{Not allowed}\\
+{\lstinline!T[$\mathit{dim}_{1}$, $\ldots$, $\mathit{dim}_{n}$]! & \emph{Not allowed} & \emph{Not allowed} \\
+Enumeration type    & {\lstinline[language=C]!int!}         & {\lstinline[language=FORTRAN77]!INTEGER!}\\
 Record              & See \cref{records}                  & \emph{Not allowed}\\
 \hline
 \end{tabular}

chapters/lexicalstructure.tex

@@ -115,18 +115,18 @@ \subsection{Modelica Keywords}\label{modelica-keywords}
 The following Modelica \firstuse[keyword]{keywords} are reserved words and shall not be used as identifiers:
 \begin{center}
 \begin{tabular}{l l l l l}
-\lstinline!algorithm! & \lstinline!discrete! & \lstinline!false! & \lstinline!loop! & \lstinline!pure!\\ \hline
-\lstinline!and! & \lstinline!each! & \lstinline!final! & \lstinline!model! & \lstinline!record!\\ \hline
-\lstinline!annotation! & \lstinline!else! & \lstinline!flow! & \lstinline!not! & \lstinline!redeclare!\\ \hline
-& \lstinline!elseif! & \lstinline!for! & \lstinline!operator! & \lstinline!replaceable!\\ \hline
-\lstinline!block! & \lstinline!elsewhen! & \lstinline!function! & \lstinline!or! & \lstinline!return!\\ \hline
-\lstinline!break! & \lstinline!encapsulated! & \lstinline!if! & \lstinline!outer! & \lstinline!stream!\\ \hline
-\lstinline!class! & \lstinline!end! & \lstinline!import! & \lstinline!output! & \lstinline!then!\\ \hline
-\lstinline!connect! & \lstinline!enumeration! & \lstinline!impure! & \lstinline!package! & \lstinline!true!\\ \hline
-\lstinline!connector! & \lstinline!equation! & \lstinline!in! & \lstinline!parameter! & \lstinline!type!\\ \hline
-\lstinline!constant! & \lstinline!expandable! & \lstinline!initial! & \lstinline!partial! & \lstinline!when!\\ \hline
-\lstinline!constrainedby! & \lstinline!extends! & \lstinline!inner! & \lstinline!protected! & \lstinline!while!\\ \hline
-\lstinline!der! & \lstinline!external! & \lstinline!input! & \lstinline!public! & \lstinline!within!\\
+{\lstinline!algorithm!} & {\lstinline!discrete!} & {\lstinline!false!} & {\lstinline!loop!} & {\lstinline!pure!}\\ \hline
+{\lstinline!and!} & {\lstinline!each!} & {\lstinline!final!} & {\lstinline!model!} & {\lstinline!record!}\\ \hline
+{\lstinline!annotation!} & {\lstinline!else!} & {\lstinline!flow!} & {\lstinline!not!} & {\lstinline!redeclare!}\\ \hline
+& {\lstinline!elseif!} & {\lstinline!for!} & {\lstinline!operator!} & {\lstinline!replaceable!}\\ \hline
+{\lstinline!block!} & {\lstinline!elsewhen!} & {\lstinline!function!} & {\lstinline!or!} & {\lstinline!return!}\\ \hline
+{\lstinline!break!} & {\lstinline!encapsulated!} & {\lstinline!if!} & {\lstinline!outer!} & {\lstinline!stream!}\\ \hline
+{\lstinline!class!} & {\lstinline!end!} & {\lstinline!import!} & {\lstinline!output!} & {\lstinline!then!}\\ \hline
+{\lstinline!connect!} & {\lstinline!enumeration!} & {\lstinline!impure!} & {\lstinline!package!} & {\lstinline!true!}\\ \hline
+{\lstinline!connector!} & {\lstinline!equation!} & {\lstinline!in!} & {\lstinline!parameter!} & {\lstinline!type!}\\ \hline
+{\lstinline!constant!} & {\lstinline!expandable!} & {\lstinline!initial!} & {\lstinline!partial!} & {\lstinline!when!}\\ \hline
+{\lstinline!constrainedby!} & {\lstinline!extends!} & {\lstinline!inner!} & {\lstinline!protected!} & {\lstinline!while!}\\ \hline
+{\lstinline!der!} & {\lstinline!external!} & {\lstinline!input!} & {\lstinline!public!} & {\lstinline!within!}\\
 \end{tabular}
 \end{center}