\begin{table}%t3 %\centering \par \caption{\label{tab:abstract}Summary of the sets of state-to-state~(STSR) $R(j'_1 \tau'_1 j'_2 \rightarrow j_1 \tau_1 j_2)(T)$ and effective rate coefficients~(ER) $\hat{R}_{j_2}(j_1 \tau_1 \rightarrow j'_1 \tau'_1)(T)$ available in BASECOL. Column~1 labels the set of state-to-state rate coefficients. $T_{\min}$(K) and $T_{\max}$(K) indicate the lowest and highest temperatures at which calculations and fits have been performed for the relevant sets of data. The column ``Transition'' indicates the number of levels among which rate coefficients are provided. T1, T2, T3, T4~indicate the expected accuracy: T1 for the 20~first levels of o-H$_2$O, T2 from the 21st to the 30th~level, T3 from the~31st to the 40th, T4~from the 41st to the 45th. A1 means ``20\% at most for the most significant rates, i.e. larger than $10^{-14}$'', A2~means ``not good but contribute only~4\% to effective rate coefficients'', the notation $X(Z)Y$ means $X$\% accuracy below a temperature of $T = Z$ Kelvin and $Y$\% accuracy above $T = Z$ Kelvin.} \small \begin{tabular}{ccccccccccc} \hline\hline\noalign{\smallskip} Set & & & & $T_{\min}$(K) & $T_{\max}$ (K) & Transitions & T1 & T2 & T3 & T4 \\ (1) & $j_2 = 0$ & $j'_2 = 0$ & STSR & 5 & 1500 & 45~levels & 5\% & 10\% & 20(100)10 & 50(100)10 \\ \noalign{\smallskip}\hline\noalign{\smallskip} (2) & & $j'_2 = 2$ & STSR & 5 & 1500 & 45~levels & A1 & & & \\ & & $j'_2 = 4$ & STSR & -- & -- & none & & & &\\ & & $\sum_{j'2}$ & ER & 5 & 1500 & 45 levels & 5\% & 15\% & 20(100)15& 50(100)15 \\ (3) & $j_2 = 2$ & $j'_2 = 0$ & STSR & 5 & 1500 & 45 levels & A1 & & & \\ (4) & & $j'_2 = 2$ & STSR & 5 & 1500 & 45~levels & 10\% & 25(10)15 & 40(10)20& 50--100(300)25 \\ (5) & & $j'_2 = 4$ & STSR & 1000 & 1500 & 10 levels & A2 & & & \\ & & $\sum_{j'2}$ & ER & 5 & 1500 & 45 levels & 10\% & 25(10)15 & 40(10)20 & 50--100(300)25 \\ & $j_2 = 4$ & $j'_2 = 0$ & STSR & -- & -- & none & \\ (6) & & $j'_2 = 2$ & STSR & 1000 & 1500 & 10 levels & A2 & & & \\ (7) & & $j'_2 = 4$ & STSR & 5 & 1500 & 10 levels & 40\% & & & \\ & & $\sum_{j'2}$ & ER & 5 & 1500 & 10 levels & 40\% & & & \\ \noalign{\smallskip} \hline \end{tabular} \end{table}