Table 4: Input parameters for a sample of C-shocks.

v$_{\rm s}$		 v0a n(H2) B0b $\chi_{\rm e}^{{b}}$ z$_{\rm n}$ z$_{\rm i}$ z$_{\rm T}$c a$_{\rm T}$c $\Delta$d T $_{\rm n,max}$e
(km s-1) (km s-1) (cm-3) ($\mu$G)   (cm) (cm) (cm) (K1/6 cm-1) (pc) (K)

20		 3.8 104 140 $7\times10^{-8}$ $1.4\times10^{16}$ $3.2\times10^{15}$ $5.0\times10^{15}$ $2.9\times10^{-16}$ 0.024 900
40 4.7 104 140 $7\times10^{-8}$ $2.8\times10^{16}$ $6.2\times10^{15}$ $1.1\times10^{16}$ $1.5\times10^{-16}$ 0.048 2200
10 3.1 105 450 $2\times10^{-8}$ $7.7\times10^{14}$ $1.7\times10^{14}$ $2.0\times10^{14}$ $5.8\times10^{-15}$ 0.0012 300
20 3.8 105 450 $2\times10^{-8}$ $1.4\times10^{15}$ $3.2\times10^{14}$ $5.0\times10^{14}$ $2.8\times10^{-15}$ 0.0024 800
30 4.3 105 450 $2\times10^{-8}$ $2.1\times10^{15}$ $4.7\times10^{14}$ $8.0\times10^{14}$ $2.0\times10^{-15}$ 0.0036 2000
40 4.7 105 450 $2\times10^{-8}$ $2.8\times10^{15}$ $6.2\times10^{14}$ $1.1\times10^{15}$ $1.6\times10^{-15}$ 0.0048 4000
20 3.8 106 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 4.7 106 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
a Calculated with Eq. (A.4) (see Appendix A) and assuming $v_{\rm A}=2.18$ km s-1. b Estimated using Eqs. (62) and (63) of Draine et al. (1983).
c Calculated considering that $b_{\rm T}=6$ and z0=0 cm. d Derived as in Dopita & Sutherland (2003) and assuming that $n_{\rm0,i}/n_{\rm H}$ $\sim $10-6. e Taken from Figs. 8b and 9b of Draine et al. (1983) for n0=104 cm-3, and n0=105, and 106 cm-3 respectively.

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