\section{Parameters} \parskip = 0pt \setlength{\tableWidth}{160mm} \setlength{\paraWidth}{\tableWidth} \setlength{\descWidth}{\tableWidth} \settowidth{\maxVarWidth}{impose\_conf\_fac\_floor\_at\_initial} \addtolength{\paraWidth}{-\maxVarWidth} \addtolength{\paraWidth}{-\columnsep} \addtolength{\paraWidth}{-\columnsep} \addtolength{\paraWidth}{-\columnsep} \addtolength{\descWidth}{-\columnsep} \addtolength{\descWidth}{-\columnsep} \addtolength{\descWidth}{-\columnsep} \noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{add\_ko\_dissipation} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Add Kreiss-Oliger dissipation?}} \\ \hline & & {\bf Default:} yes \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{beta\_alp} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Exponent for lapse in front of Gamma\^i in shift condition}} \\ \hline{\bf Range} & & {\bf Default:} 0.0 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering *:*} & \multicolumn{2}{p{\paraWidth}|}{Anything possible, default is zero} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{beta\_gamma} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Prefactor to the Gamma\^i term in shift condition}} \\ \hline{\bf Range} & & {\bf Default:} 0.75 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering *:*} & \multicolumn{2}{p{\paraWidth}|}{Anything possible} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{boundary\_conditions} & {\bf Scope:} private & KEYWORD \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Outer boundary conditions for BSSN variables}} \\ \hline{\bf Range} & & {\bf Default:} radiative \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering radiative} & \multicolumn{2}{p{\paraWidth}|}{Use radiative boundary conditions from NewRadX} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering none} & \multicolumn{2}{p{\paraWidth}|}{Do not impose boundary conditions here, but let CarpetX set it} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{calculate\_constraints} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Calculate the BSSN constraints?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{calculate\_constraints\_every} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Calculate the BSSN constraints every N iterations}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering *:*} & \multicolumn{2}{p{\paraWidth}|}{0 or a negative value means never compute them} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{chi\_gamma} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Coefficient to Yo-term in the {\textbackslash}tilde\{Gamma\} equation. See gr-qc/0209066}} \\ \hline{\bf Range} & & {\bf Default:} 0.666666666666667 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering *:*} & \multicolumn{2}{p{\paraWidth}|}{2/3 is a good value; the sign must be the same as betak,k} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{conf\_fac\_floor} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Minimal value of conformal factor}} \\ \hline{\bf Range} & & {\bf Default:} 1.0d-04 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering *:*} & \multicolumn{2}{p{\paraWidth}|}{Any value possible} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{derivs\_order} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Accuracy of spatial finite difference stencils in RHS calculation}} \\ \hline{\bf Range} & & {\bf Default:} 4 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 4} & \multicolumn{2}{p{\paraWidth}|}{4th order accurate stencils} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 6} & \multicolumn{2}{p{\paraWidth}|}{6th order accurate stencils} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 8} & \multicolumn{2}{p{\paraWidth}|}{8th order accurate stencils} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{diss\_eps} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Strength coefficient for Kreiss-Oliger dissipation}} \\ \hline{\bf Range} & & {\bf Default:} 0.15 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0.0:*} & \multicolumn{2}{p{\paraWidth}|}{0 to turn off dissipation, most commonly use 0.15} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{diss\_order} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Accuracy of Kreiss-Oliger dissipation stencils; should be 1 highehr than derivs\_order}} \\ \hline{\bf Range} & & {\bf Default:} 5 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 5} & \multicolumn{2}{p{\paraWidth}|}{5th order accurate stencils} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 7} & \multicolumn{2}{p{\paraWidth}|}{7th order accurate stencils} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 9} & \multicolumn{2}{p{\paraWidth}|}{9th order accurate stencils} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{eta\_beta} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Damping parameter in live shift}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:*} & \multicolumn{2}{p{\paraWidth}|}{non-negative} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{eta\_transition} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Use an r-dependent damping parameter eta?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{eta\_transition\_eps} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Minimal value of radius squared for eta\_transition}} \\ \hline{\bf Range} & & {\bf Default:} 1.0d-06 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:*} & \multicolumn{2}{p{\paraWidth}|}{Any value possible} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{eta\_transition\_r} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Transition radius for r-dependent eta}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:*} & \multicolumn{2}{p{\paraWidth}|}{non-negative} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{impose\_conf\_fac\_floor\_at\_initial} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Use floor value on initial data?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{kappa\_alpha} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Coefficient in slicing condition - default is 2 for 1+log}} \\ \hline{\bf Range} & & {\bf Default:} 2.0 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering *:*} & \multicolumn{2}{p{\paraWidth}|}{Any value possible} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{make\_aa\_tracefree} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Remove trace of {\textbackslash}tilde\{A\}\_\{ij\} after each timestep?}} \\ \hline & & {\bf Default:} yes \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{n\_aij} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em n power of outgoing boundary r\^n fall off rate for conformal tracefree extrinsic curvature}} \\ \hline{\bf Range} & & {\bf Default:} 2 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:2} & \multicolumn{2}{p{\paraWidth}|}{2 is reasonable} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{n\_alpha} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em n power of outgoing boundary r\^n fall off rate for lapse}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:2} & \multicolumn{2}{p{\paraWidth}|}{1 is my guess} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{n\_beta} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em n power of outgoing boundary r\^n fall off rate for shift}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:2} & \multicolumn{2}{p{\paraWidth}|}{1 is my guess} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{n\_conf\_fac} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em n power of outgoing boundary r\^n fall off rate for conformal factor}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:2} & \multicolumn{2}{p{\paraWidth}|}{1 is reasonable} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{n\_gammat} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em n power of outgoing boundary r\^n fall off rate for conformal connection}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:2} & \multicolumn{2}{p{\paraWidth}|}{Maybe 1?} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{n\_hij} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em n power of outgoing boundary r\^n fall off rate for conformal metric}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:2} & \multicolumn{2}{p{\paraWidth}|}{1 is reasonable} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{n\_trk} & {\bf Scope:} private & INT \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em n power of outgoing boundary r\^n fall off rate for trace of extrinsic curvature}} \\ \hline{\bf Range} & & {\bf Default:} 2 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:2} & \multicolumn{2}{p{\paraWidth}|}{2 is reasonable} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{precollapsed\_lapse} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Initialize lapse as alp*psi\^\{-2\} ?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{refinement\_criterion} & {\bf Scope:} private & KEYWORD \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em How to compute regrid error for AMR?}} \\ \hline{\bf Range} & & {\bf Default:} fixed \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering fixed} & \multicolumn{2}{p{\paraWidth}|}{Distance to origin} \\\multicolumn{1}{|p{\maxVarWidth}|}{see [1] below} & \multicolumn{2}{p{\paraWidth}|}{Conformal factor minus 1} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering conf\_fac\_laplacian} & \multicolumn{2}{p{\paraWidth}|}{Laplacian of conformal factor} \\\multicolumn{1}{|p{\maxVarWidth}|}{see [1] below} & \multicolumn{2}{p{\paraWidth}|}{Sum absolute values of each term in Hamiltonian constraint} \\\hline \end{tabular*} \vspace{0.5cm}\noindent {\bf [1]} \noindent \begin{verbatim}conf\_fac\_minus\_one\end{verbatim}\noindent {\bf [1]} \noindent \begin{verbatim}ham\_constraint\_absolute\end{verbatim}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{rescale\_shift\_initial} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Initialize shift as psi\^\{-2\} beta ?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{reset\_dethh} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Reset determinant of conformal metric?}} \\ \hline & & {\bf Default:} yes \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{slicing\_condition} & {\bf Scope:} private & KEYWORD \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Lapse slicing condition}} \\ \hline{\bf Range} & & {\bf Default:} 1+log \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering geodesic} & \multicolumn{2}{p{\paraWidth}|}{geodesic slicing} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering harmonic} & \multicolumn{2}{p{\paraWidth}|}{harmonic slicing} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 1+log} & \multicolumn{2}{p{\paraWidth}|}{1+log slicing} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering shock-avoiding} & \multicolumn{2}{p{\paraWidth}|}{shock-avoiding slicing from arXiv:2207.06376 [gr-qc]} \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering SSL} & \multicolumn{2}{p{\paraWidth}|}{slow-start lapse from arXiv:2404.01137 [gr-qc]} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{ssl\_amp} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Amplitude of slow-start lapse Gaussian}} \\ \hline{\bf Range} & & {\bf Default:} 0.6 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:*} & \multicolumn{2}{p{\paraWidth}|}{Anything positive; 0.6 was used in arXiv:2404.01137 [gr-qc]} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{ssl\_sigma} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Width of slow-start lapse Gaussian}} \\ \hline{\bf Range} & & {\bf Default:} 20.0 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:*} & \multicolumn{2}{p{\paraWidth}|}{Anything positive; 20 was used in arXiv:2404.01137 [gr-qc]} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{use\_advection\_stencils} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Use lopsided stencils for advection derivatives?}} \\ \hline & & {\bf Default:} yes \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{use\_local\_error\_estimate} & {\bf Scope:} private & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Compute local regrid error to refine/derefine cells?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{zeta\_alpha} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Prefactor to the advection term in slicing condition}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering *:*} & \multicolumn{2}{p{\paraWidth}|}{Anything possible} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{zeta\_beta} & {\bf Scope:} private & REAL \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Prefactor to the advection term in shift condition}} \\ \hline{\bf Range} & & {\bf Default:} 1 \\\multicolumn{1}{|p{\maxVarWidth}|}{\centering 0:*} & \multicolumn{2}{p{\paraWidth}|}{non-negative} \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{stress\_energy\_state} & {\bf Scope:} restricted & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Add matter contributions from TmunuBaseX to RHS and constraints?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\noindent \begin{tabular*}{\tableWidth}{|c|l@{\extracolsep{\fill}}r|} \hline \multicolumn{1}{|p{\maxVarWidth}}{z\_is\_radial} & {\bf Scope:} restricted & BOOLEAN \\\hline \multicolumn{3}{|p{\descWidth}|}{{\bf Description:} {\em Use with multipatch?}} \\ \hline & & {\bf Default:} no \\\hline \end{tabular*} \vspace{0.5cm}\parskip = 10pt