Content-Type: application/octet-stream \begin{tabular}{l|l|l|ll|l|ll} \hline\hline \rule{0mm}{4mm}{\bf Upper} & {\bf Lower} & {\bf $\lambda $/\AA} & \multicolumn{2}{l|}{\bf Branching} & \multicolumn{3}{c}{${\bf A}_{ki}{\bf /10}^8{\bf s}^{-1}$} \\ {\bf level} & {\bf level} & & \multicolumn{2}{l|}{\bf ratio} & \multicolumn{3}{l}{{\it this work} \hspace{3em} {\it other authors}} \\ \hline $\rule{0mm}{5mm} 3p^2\:^1\!D_2$ &$3p\:^1\!P_1^o$ & 3900.675 & 0.79 & 13\% & $1.84\times 10^{-4}$ & & \\ &$3p\:^3\!P_1^o$ & 2081.481 & 0.08 & 48\% & $0.19\times 10^{-4}$ & & \\ &$3p\:^3\!P_2^o$ & 2086.864 & 0.13 & 42\% & $0.30\times 10^{-4}$ & & \\ %& & & & & & & \\ $3d\:^3\!F_2^o$ &$3d\:^3\!D_1$ & 2195.502 & 0.70 & 13\% & $<$2 & 2.14 & Chang and Wang (1987) \\ &$4d\:^3\!D_1$ & 5100.34 & 0.30 & 31\% & $<$0.85 & 0.012 & Chang and Wang (1987) \\ $3d\:^3\!F_3^o$ &$3d\:^3\!D_2$ & 2194.245 & 0.76 & 13\% & $<$2.2 & 2.25 & Chang and Wang (1987) \\ &$4d\:^3\!D_2$ & 5093.65 & 0.24 & 40\% & $<$0.7 & 0.013 & Chang and Wang (1987) \\ $3d\:^3\!F_4^o$ &$3d\:^3\!D_3$ & 2192.604 & 0.72 & 10\% & $<$2.1 & 2.54 & Chang and Wang (1987) \\ &$4d\:^3\!D_3$ & 5085.02 & 0.28 & 26\% & $<$0.8 & 0.015 & Chang and Wang (1987) \\ %& & & & & & & \\ $4f\:^3\!F_2^o$ &$3d\:^3\!D_1$ & 3587.450 & 0.98 & 3\% & $<1.55\quad >11$\% & 1.98 & Chang and Wang (1987) \\ &$3d\:^3\!D_2$ & 3587.3 & 0.02 & 100\% & & & \\ &$3d\:^3\!D_3$ & 3587.1 & $\approx 0$ & & & & \\ $4f\:^3\!F_3^o$ &$3d\:^3\!D_2$ & 3587.068 & 0.96 & 5\% & $<1.55\quad >$13\% & 2.07 & Chang and Wang (1987) \\ &$3d\:^3\!D_3$ & 3587.9 & 0.04 & 100\% & & & \\ &$3p^2\:^1\!D_2$ & 2635.020 & $\approx 0$ & & & & \\ $4f\:^3\!F_4^o$ &$3d\:^3\!D_3$ & 3586.557 & & & $<1.55$ & 2.33 & Chang and Wang (1987) \\ %& & & & & & \\ $5f\:^3\!F_2^o$ &$3d\:^3\!D_1$ & 2638.690 & $\approx 1.00$ & & $<0.7$ & 0.25 & Chang and Wang (1987) \\ $5f\:^3\!F_3^o$ &$3d\:^3\!D_2$ & 2638.255 & $\approx 1.00$ & & $<0.7$ & & \\ $5f\:^3\!F_4^o$ &$3d\,^3D_3$ & 2637.689 & $\approx 1.00$ & & $<0.7$ & 0.29 & Chang and Wang (1987) \\ $6f\:^3\!F_2^o$ &$3d\:^3\!D_1$ & 2326.496 & 0.18 & 26\% & $<0.12$ & 0.31 & Chang and Wang (1987) \\ &$4d\:^3\!D_1$ & 5867.81 & 0.82 & 6\% & $<0.54$ & 0.10 & Chang and Wang (1987) \\ $6f\:^3\!F_3^o$ &$3d\:^3\!D_2$ & 2325.494 & 0.32 & 15\% & $<0.21$ & 0.33 & Chang and Wang (1987) \\ &$4d\:^3\!D_2$ & 5861.53 & 0.68 & 7\% & $<0.45$ & 0.11 & Chang and Wang (1987) \\ $6f\:^3\!F_4^o$ &$3d\:^3\!D_3$ & 2324.199 & 0.41 & 20\% & $<0.27$ & 0.37 & Chang and Wang (1987) \\ &$4d\:^3\!D_3$ & 5853.62 & 0.59 & 20\% & $<0.39$ & 0.12 & Chang and Wang (1987) \\ %& & & & & & \\ $7f\:^3\!F_2^o$ &$3d\:^3\!D_1$ & 2095.140 & 0.97 & 7\% & $<2$ & 1.47 & Chang and Wang (1987) \\ &$4d\:^3\!D_1$ & 4589.742 & 0.03 & 100\% & & & \\ $7f\:^3\!F_3^o$ &$3d\:^3\!D_2$ & 2094.790 & 0.98 & 4\% & $<2$ & 1.57 & Chang and Wang (1987) \\ &$4d\:^3\!D_2$ & 4588.191 & 0.02 & 100\% & & & \\ $7f\:^3\!F_4^o$ &$3d\:^3\!D_3$ & 2094.264 & 0.98 & 3\% & $<2$ & 1.74 & Chang and Wang (1987) \\ &$4d\:^3\!D_3$ & 4585.817 & 0.02 & 100\% & & & \\[1.5ex] \hline\hline \end{tabular}