\begin{table}%t4 \par \caption {\label{tab:lines}List of the \ion{Fe}{xvii} strongest lines in the 200--450~\AA\ range.} %\centerline {\begin{tabular}{@{}llcclllll@{}} \hline\hline $i-j$ & Transition & $Int$ & $Int$(B84) & $\lambda_{\rm exp.}$ & $\lambda_{\rm CC}$ & $\lambda_{\rm NIST}$ & $\lambda_{\rm MR-MP}$ & \\ \hline 3--15 & 2s$^2$2p$^5$3s $^1$P$_{1}$--2s$^2$2p$^5$3p $^1$S$_{0}$ & 1.0 & 1 & 204.668 & 196.38& 204.650& 205.34 & \\ 5--15 & 2s$^2$2p$^5$3s $^3$P$_{1}$--2s$^2$2p$^5$3p $^1$S$_{0}$ & 1.1 & 1.1 & 254.885 & 243.47& 254.751& 255.93 & \\ 2--8 & 2s$^2$2p$^5$3s $^3$P$_{2}$--2s$^2$2p$^5$3p $^3$D$_{3}$ & 1.2 & 0.54 & 350.478 & 348.22& 350.582& 350.30 & \\ 5--14 & 2s$^2$2p$^5$3s $^3$P$_{1}$--2s$^2$2p$^5$3p $^1$D$_{2}$ & 0.78 & 0.28 & 347.816 & 345.98& 347.959& 347.69 & \\ 2--6 & 2s$^2$2p$^5$3s $^3$P$_{2}$--2s$^2$2p$^5$3p $^3$S$_{1}$ & 0.77 & 0.4 & 409.705 & 408.70& 409.903& 409.30 & \\ 8--19 & 2s$^2$2p$^5$3p $^3$D$_{3}$--2s$^2$2p$^5$3d $^3$F$_{4}$ & 0.42 & 0.27 & 283.942 & 282.86& 284.010& 283.97 & \\ 2--10 & 2s$^2$2p$^5$3s $^3$P$_{2}$--2s$^2$2p$^5$3p $^3$P$_{2}$ & 0.47 & 0.17 & 323.572 & 321.97& 323.646& 323.50 & \\ 3--9 & 2s$^2$2p$^5$3s $^1$P$_{1}$--2s$^2$2p$^5$3p $^1$P$_{1}$ & 0.48 & 0.16 & 358.247 & 356.33& 358.320& 358.05 & \\ 7--20 & 2s$^2$2p$^5$3p $^3$D$_{2}$--2s$^2$2p$^5$3d $^3$F$_{3}$ & 0.35 & 0.16 & 269.420 & 267.82& 269.295& 269.44 & \\ 14--26 & 2s$^2$2p$^5$3p $^1$D$_{2}$--2s$^2$2p$^5$3d $^1$F$_{3}$ & 0.37 & 0.14 & 280.160 & 278.64& 280.198& 280.24 & \\ 2--7 & 2s$^2$2p$^5$3s $^3$P$_{2}$--2s$^2$2p$^5$3p $^3$D$_{2}$ & 0.44 & 0.18 & 367.288 & 365.48& 367.377& 367.16 & \\ 3--7 & 2s$^2$2p$^5$3s $^1$P$_{1}$--2s$^2$2p$^5$3p $^3$D$_{2}$ & 0.43 & 0.17 & 389.111 & 387.50& 389.226& 388.93 & \\ 10--22 & 2s$^2$2p$^5$3p $^3$P$_{2}$--2s$^2$2p$^5$3d $^3$D$_{3}$ & 0.29 & 0.092 & 280.160 & 278.32& 280.206& 280.17 & \\ 3--10 & 2s$^2$2p$^5$3s $^1$P$_{1}$--2s$^2$2p$^5$3p $^3$P$_{2}$ & 0.34 & 0.14 & 340.391 & 338.93& 340.483& 340.28 & \\ 4--13 & 2s$^2$2p$^5$3s $^3$P$_{0}$--2s$^2$2p$^5$3p $^3$P$_{1}$ & 0.34 & 0.13 & 340.122 & 338.42& 340.136& 339.97 & \\ 3--11 & 2s$^2$2p$^5$3s $^1$P$_{1}$--2s$^2$2p$^5$3p $^3$P$_{0}$ & 0.27 & 0.1 & 295.981 & 293.43& 296.314& 295.77 & \\ 13--25 & 2s$^2$2p$^5$3p $^3$P$_{1}$--2s$^2$2p$^5$3d $^3$D$_{2}$ & 0.24 & 0.14 & 281.120 & 279.65& 281.104& 281.16 & \\ 12--24 & 2s$^2$2p$^5$3p $^3$D$_{1}$--2s$^2$2p$^5$3d $^3$F$_{2}$ & 0.21 & 0.11 & 266.417 & 265.20& 266.432& 266.45 & \\ 6--18 & 2s$^2$2p$^5$3p $^3$S$_{1}$--2s$^2$2p$^5$3d $^3$P$_{2}$ & 0.20 & 0.13 & 254.536 & 253.32& 254.485& 254.60 & \\ 5--12 & 2s$^2$2p$^5$3s $^3$P$_{1}$--2s$^2$2p$^5$3p $^3$D$_{1}$ & 0.29 & 0.11 & 387.231 & 385.26& 387.357& 387.02 & \\ 9--21 & 2s$^2$2p$^5$3p $^1$P$_{1}$--2s$^2$2p$^5$3d $^1$D$_{2}$ & 0.17 & 0.067 & 275.550 & 274.28& 275.596& 275.60 & \\ 4--12 & 2s$^2$2p$^5$3s $^3$P$_{0}$--2s$^2$2p$^5$3p $^3$D$_{1}$ & 0.22 & 0.084 & 373.430 & 370.93& 373.385& 373.25 & \\ 5--13 & 2s$^2$2p$^5$3s $^3$P$_{1}$--2s$^2$2p$^5$3p $^3$P$_{1}$ & 0.19 & 0.074 & 351.533 & 350.31& 351.692& 351.36 & \\ 10--18 & 2s$^2$2p$^5$3p $^3$P$_{2}$--2s$^2$2p$^5$3d $^3$P$_{2}$ & 0.13 & 0.098 & 304.971 & 304.09& 304.943& 304.91 & \\ 7--21 & 2s$^2$2p$^5$3p $^3$D$_{2}$--2s$^2$2p$^5$3d $^1$D$_{2}$ & 0.10 & 0.039 & 259.705 & 258.29& 259.734& 259.72 & \\ 6--16 & 2s$^2$2p$^5$3p $^3$S$_{1}$--2s$^2$2p$^5$3d $^3$P$_{0}$ & $9.6 \times 10^{-2}$ & 0.072 & 269.886 & 269.62& 269.884& 269.98 & \\ 8--22 & 2s$^2$2p$^5$3p $^3$D$_{3}$--2s$^2$2p$^5$3d $^3$D$_{3}$ & $7.8\times 10^{-2}$ & -- & 262.699 & 261.29& 262.729& 262.76 & \\ 2--13 & 2s$^2$2p$^5$3s $^3$P$_{2}$--2s$^2$2p$^5$3p $^3$P$_{1}$ & $7.2\times 10^{-2}$ & -- & 252.525 & 250.31& 252.704& 252.44 & \\ 8--20 & 2s$^2$2p$^5$3p $^3$D$_{3}$--2s$^2$2p$^5$3d $^3$F$_{3}$ & $5.8\times 10^{-2}$ & -- & 279.245 & 277.91& 279.096& 279.31 & \\ 33--37 & 2p$^6$3p $^1$P$_{1}$--2p$^6$3d $^1$D$_{2}$ & $4.9 \times 10^{-2}$ & -- & 273.347 & 271.73& -- & 273.52 & \\ 9--18 & 2s$^2$2p$^5$3p $^1$P$_{1}$--2s$^2$2p$^5$3d $^3$P$_{2}$ & $3.6 \times 10^{-2}$ & -- & 291.934 & 291.33& 291.928& 291.93 & \\ 7--18 & 2s$^2$2p$^5$3p $^3$D$_{2}$--2s$^2$2p$^5$3d $^3$P$_{2}$ & $3.3 \times 10^{-2}$ & -- & 274.210 & 273.35& 274.190& 274.18 & \\ 6--17 & 2s$^2$2p$^5$3p $^3$S$_{1}$--2s$^2$2p$^5$3d $^3$P$_{1}$ & $2.8 \times 10^{-2}$ & -- & 264.785 & 263.63& 264.306& 264.47 & \\ 14--25 & 2s$^2$2p$^5$3p $^1$D$_{2}$--2s$^2$2p$^5$3d $^3$D$_{2}$ & $3.0\times 10^{-2}$ & -- & 283.543 & 282.48& 283.535& 283.56 & \\ 5--11 & 2s$^2$2p$^5$3s $^3$P$_{1}$--2s$^2$2p$^5$3p $^3$P$_{0}$ & $4.0 \times 10^{-2}$ & -- & 413.911 & 412.69& 414.285& 413.52 & \\ 14--24 & 2s$^2$2p$^5$3p $^1$D$_{2}$--2s$^2$2p$^5$3d $^3$F$_{2}$ & $2.5\times 10^{-2}$ & -- & 288.945 & 287.69& 288.934& 288.95 & \\ 2--9 & 2s$^2$2p$^5$3s $^3$P$_{2}$--2s$^2$2p$^5$3p $^1$P$_{1}$ & $2.8 \times 10^{-2}$ & -- & 339.666 & 337.62& 339.720& 339.51 & \\ 10--25 & 2s$^2$2p$^5$3p $^3$P$_{2}$--2s$^2$2p$^5$3d $^3$D$_{2}$ & $1.6 \times 10^{-2}$ & -- & 225.902 & 223.97& 225.999& 225.90 & \\ 3--6 & 2s$^2$2p$^5$3s $^1$P$_{1}$--2s$^2$2p$^5$3p $^3$S$_{1}$ & $2.6 \times 10^{-2}$ & -- & 437.048 & 436.43& 437.292& 436.55 & \\ 2--14 & 2s$^2$2p$^5$3s $^3$P$_{2}$--2s$^2$2p$^5$3p $^1$D$_{2}$ & $1.3 \times 10^{-2}$ & -- & 250.601 & 248.09& 250.771& 250.54 & \\ 8--18 & 2s$^2$2p$^5$3p $^3$D$_{3}$--2s$^2$2p$^5$3d $^3$P$_{2}$ & $1.2 \times 10^{-2}$ & -- & 284.394 & 283.87& 284.357& 284.40 & \\ 32--36 & 2p$^6$3p $^3$P$_{2}$--2p$^6$3d $^3$D$_{3}$ & $1.1\times 10^{-2}$ & -- & -- & 291.82& -- & 291.71 & \\ 3--14 & 2s$^2$2p$^5$3s $^1$P$_{1}$--2s$^2$2p$^5$3p $^1$D$_{2}$ & $1.0 \times 10^{-2}$ & -- & 260.573 & 258.05& 260.763& 260.49 & \\ 6--21 & 2s$^2$2p$^5$3p $^3$S$_{1}$--2s$^2$2p$^5$3d $^1$D$_{2}$ & $7.3\times 10^{-3}$ & -- & 241.990 & 240.33& 241.984& 242.09 & \\ 31--35 & 2p$^6$3p $^3$P$_{1}$--2p$^6$3d $^3$D$_{2}$ & $6.9 \times 10^{-3}$ & -- & -- & 278.22& -- & 278.19 & \\ 7--25 & 2s$^2$2p$^5$3p $^3$D$_{2}$--2s$^2$2p$^5$3d $^3$D$_{2}$ & $5.1\times 10^{-3}$ & -- & 208.571 & 206.84& 208.655& 208.58 & \\ 31--37 & 2p$^6$3p $^3$P$_{1}$--2p$^6$3d $^1$D$_{2}$ & $6.1\times 10^{-3}$ & -- & 250.198 & 248.34& -- & 250.01 & \\ 13--24 & 2s$^2$2p$^5$3p $^3$P$_{1}$--2s$^2$2p$^5$3d $^3$F$_{2}$ & $5.1\times 10^{-3}$ & -- & 286.429 & 284.76& 286.410& 286.47 & \\ 28--32 & 2p$^6$3s $^3$S$_{1}$--2p$^6$3p $^3$P$_{2}$ & $5.4\times 10^{-3}$ & -- & -- & 346.41& -- & 348.84 & \\ % \hline %inserts single line \end{tabular}} \par \smallskip Notes: For a description of the columns see Table~\ref{tab:lines2}. The relative intensities (photons) $Int=N_{j} A_{ji}/N_{\rm e}$ were calculated at an electron density of 10$^{11}$~cm$^{-3}$. The fourth column provides the relative intensities calculated by \cite{bhatia_etal:85} as reported in \cite{feldman_etal:85}. \vspace*{4mm} \end{table}