\begin{table}%t4
\caption{Input parameters for a sample of C-shocks.}\label{tab1}
\small %\centerline
{
\begin{tabular}{ccccccccccc}      
\hline\hline    \noalign{\smallskip}   
\textit{v}$_{\rm s}$ & $v_0^{{a}}$ & {$n$(H$_2$)} & \textit{B$_0$}$^{{b}}$
 & $\chi_{\rm e}^{{b}}$ & \textit{z$_{\rm n}$} & \textit{z$_{\rm i}$} & 
\textit{z$_{\rm T}$}$^{{c}}$ & \textit{a$_{\rm T}$}$^{{c}}$ & $\Delta$$^{{d}}$ & \textit{T}$_{\rm n,max}$$^{{e}}$ \\ 
(km$~$s$^{-1}$) & (km$~$s$^{-1}$) & (cm$^{-3}$) & ($\mu$G) & & (cm) & (cm) & (cm) &
(K$^{1/6}$~cm$^{-1}$) & (pc) & (K) \\
\hline     \noalign{\smallskip}               
   20 & 3.8 & 10$^4$ & 140 & $7\times10^{-8}$ & $1.4\times10^{16}$ & 
   $3.2\times10^{15}$ & $5.0\times10^{15}$ & $2.9\times10^{-16}$
   & 0.024 & 900 \\
   40 & 4.7 & 10$^4$ & 140 & $7\times10^{-8}$ & $2.8\times10^{16}$ & 
   $6.2\times10^{15}$ & $1.1\times10^{16}$ & $1.5\times10^{-16}$
   & 0.048 & 2200 \\
   10 & 3.1 & 10$^5$ & 450 & $2\times10^{-8}$ & $7.7\times10^{14}$ & 
   $1.7\times10^{14}$ & $2.0\times10^{14}$ & $5.8\times10^{-15}$ 
   & 0.0012 & 300 \\
   20 & 3.8 & 10$^5$ & 450 & $2\times10^{-8}$ & $1.4\times10^{15}$ & 
   $3.2\times10^{14}$ & $5.0\times10^{14}$ & $2.8\times10^{-15}$ 
   & 0.0024 & 800 \\ 
   30 & 4.3 & 10$^5$ & 450 & $2\times10^{-8}$ & $2.1\times10^{15}$ & 
   $4.7\times10^{14}$ & $8.0\times10^{14}$ & $2.0\times10^{-15}$
   & 0.0036 & 2000 \\
   40 & 4.7 & 10$^5$ & 450 & $2\times10^{-8}$ & $2.8\times10^{15}$ & 
   $6.2\times10^{14}$ & $1.1\times10^{15}$ & $1.6\times10^{-15}$
   & 0.0048 & 4000 \\
   20 & 3.8 & 10$^6$ & 1400 & $7\times10^{-9}$ & $1.4\times10^{14}$ & 
   $3.2\times10^{13}$ & $5.0\times10^{13}$ & $2.8\times10^{-14}$
   & $2.4\times10^{-4}$ & 800 \\
   40 & 4.7 & 10$^6$ & 1400 & $7\times10^{-9}$ & $2.8\times10^{14}$ & 
   $6.2\times10^{13}$ & $1.1\times10^{14}$ & $1.6\times10^{-14}$
   & $4.8\times10^{-4}$ & 4000 \\
\hline                  
\end{tabular}}
\smallskip
 $^{ {a}}$ Calculated with Eq.~(\ref{v0}) (see Appendix~A) and assuming $v_{\rm A}=2.18$~km~s$^{-1}$.   $^{ {b}}$ Estimated using Eqs.~(62) and (63) of \citet{drd83}.
\\
 $^{{c}}$ Calculated considering that $b_{\rm T}=6$ and $z_0=0$~cm.  $^{ {d}}$ Derived as in \citet{dop03} and assuming   that $n_{\rm 0,i}/n_{\rm H}$$~$$\sim$10$^{-6}$.  $^{ {e}}$ Taken from Figs.~8b and~9b of \citet{drd83} for $n_0=10^4$~cm$^{-3}$, and $n_0=10^5$, and 10$^6$~cm$^{-3}$ respectively.
\end{table}