Here you find various information on the brightest lines, ordered in wavelength:
Wavelengths (Angstroms); weighted oscillator strengths (gf);
transition probabilities (A);
intensities (normalised) at
106 , 1010, 1015, 1020
cm-3;
together with:
Configuration; Term; Index of the level (1=ground); Energy (observed if available - otherwise theoretical);
of the lower (l) and upper levels (u)
Note that intensities have been calculated at log T[K]=5.20, where the ion fraction peaks in ionization equilibrium. Only lines brighter than 0.001 the strongest line (at all densities) are retained.
Wavelength |
gf |
Aul |
R |
R |
R |
R |
Cl |
Tl |
Cu | Tu |
Il | Iu |
El | Eu |
(A) | (s-1) |
(106) |
(1010) |
(1015) |
(1020) |
(cm-1) | (cm-1) |
|||||||
| 208.4860 | 2.99e-01 | 7.65e+09 | 8.18e-03 | 1.27e-02 | 1.28e-02 | 2.45e-01 | 2s2.2p3 | 4S3/2 | 2s2.2p2(3P).3s | 4P5/2 | 1 | 16 | 0 | 479650 |
| 208.7340 | 2.00e-01 | 7.65e+09 | 5.58e-03 | 8.79e-03 | 8.90e-03 | 1.64e-01 | 2s2.2p3 | 4S3/2 | 2s2.2p2(3P).3s | 4P3/2 | 1 | 15 | 0 | 479080 |
| 208.8990 | 1.00e-01 | 7.65e+09 | 2.81e-03 | 4.52e-03 | 4.57e-03 | 8.26e-02 | 2s2.2p3 | 4S3/2 | 2s2.2p2(3P).3s | 4P1/2 | 1 | 14 | 0 | 478700 |
| 212.5600 | 4.00e-01 | 9.83e+09 | 2.43e-03 | 7.24e-03 | 7.37e-03 | 2.19e-01 | 2s2.2p3 | 2D5/2 | 2s2.2p2(1D).3s | 2D5/2 | 3 | 22 | 41237 | 511694 |
| 212.5630 | 2.47e-02 | 9.10e+08 | 1.46e-04 | 4.37e-04 | 4.44e-04 | 1.35e-02 | 2s2.2p3 | 2D5/2 | 2s2.2p2(1D).3s | 2D3/2 | 3 | 21 | 41237 | 511687 |
| 212.5800 | 3.41e-02 | 8.38e+08 | 2.07e-04 | 6.17e-04 | 6.28e-04 | 1.86e-02 | 2s2.2p3 | 2D3/2 | 2s2.2p2(1D).3s | 2D5/2 | 2 | 22 | 41282 | 511694 |
| 212.5830 | 2.54e-01 | 9.38e+09 | 1.50e-03 | 4.51e-03 | 4.58e-03 | 1.39e-01 | 2s2.2p3 | 2D3/2 | 2s2.2p2(1D).3s | 2D3/2 | 2 | 21 | 41282 | 511687 |
| 222.5940 | 1.44e-01 | 3.24e+09 | 7.63e-04 | 2.28e-03 | 2.32e-03 | 6.88e-02 | 2s2.2p3 | 2P3/2 | 2s2.2p2(1D).3s | 2D5/2 | 5 | 22 | 62444 | 511694 |
| 222.5940 | 8.09e-02 | 2.72e+09 | 4.16e-04 | 1.25e-03 | 1.27e-03 | 3.84e-02 | 2s2.2p3 | 2P1/2 | 2s2.2p2(1D).3s | 2D3/2 | 4 | 21 | 62438 | 511687 |
| 222.5970 | 2.63e-02 | 8.85e+08 | 1.35e-04 | 4.06e-04 | 4.13e-04 | 1.25e-02 | 2s2.2p3 | 2P3/2 | 2s2.2p2(1D).3s | 2D3/2 | 5 | 21 | 62444 | 511687 |
| 223.2330 | 3.50e-01 | 1.17e+10 | 2.87e-03 | 8.86e-03 | 9.04e-03 | 2.09e-01 | 2s2.2p3 | 2D5/2 | 2s2.2p2(3P).3s | 2P3/2 | 3 | 20 | 41237 | 489200 |
| 223.2560 | 2.70e-02 | 9.03e+08 | 2.21e-04 | 6.83e-04 | 6.97e-04 | 1.61e-02 | 2s2.2p3 | 2D3/2 | 2s2.2p2(3P).3s | 2P3/2 | 2 | 20 | 41282 | 489200 |
| 223.6080 | 2.00e-01 | 1.34e+10 | 1.61e-03 | 4.89e-03 | 4.97e-03 | 1.19e-01 | 2s2.2p3 | 2D3/2 | 2s2.2p2(3P).3s | 2P1/2 | 2 | 19 | 41282 | 488495 |
| 234.3230 | 5.34e-02 | 1.62e+09 | 3.79e-04 | 1.17e-03 | 1.19e-03 | 2.77e-02 | 2s2.2p3 | 2P1/2 | 2s2.2p2(3P).3s | 2P3/2 | 4 | 20 | 62438 | 489200 |
| 234.3260 | 2.56e-01 | 7.79e+09 | 1.82e-03 | 5.61e-03 | 5.73e-03 | 1.33e-01 | 2s2.2p3 | 2P3/2 | 2s2.2p2(3P).3s | 2P3/2 | 5 | 20 | 62444 | 489200 |
| 234.7110 | 9.97e-02 | 6.04e+09 | 6.93e-04 | 2.10e-03 | 2.14e-03 | 5.14e-02 | 2s2.2p3 | 2P1/2 | 2s2.2p2(3P).3s | 2P1/2 | 4 | 19 | 62438 | 488495 |
| 234.7140 | 4.34e-02 | 2.62e+09 | 3.01e-04 | 9.14e-04 | 9.31e-04 | 2.24e-02 | 2s2.2p3 | 2P3/2 | 2s2.2p2(3P).3s | 2P1/2 | 5 | 19 | 62444 | 488495 |
| 357.8260 | 7.30e-01 | 1.90e+10 | 9.10e-02 | 2.45e-01 | 2.49e-01 | 5.39e-01 | 2s2.2p3 | 2D3/2 | 2s.2p4 | 2P1/2 | 2 | 12 | 41282 | 320748 |
| 358.6880 | 1.36e+00 | 1.76e+10 | 1.81e-01 | 4.52e-01 | 4.60e-01 | 1.00e+00 | 2s2.2p3 | 2D5/2 | 2s.2p4 | 2P3/2 | 3 | 13 | 41237 | 320031 |
| 358.7460 | 1.66e-01 | 2.16e+09 | 2.22e-02 | 5.55e-02 | 5.64e-02 | 1.23e-01 | 2s2.2p3 | 2D3/2 | 2s.2p4 | 2P3/2 | 2 | 13 | 41282 | 320031 |
| 387.0760 | 1.94e-03 | 4.33e+07 | 9.99e-06 | 9.27e-04 | 9.52e-04 | 1.38e-03 | 2s2.2p3 | 2D3/2 | 2s.2p4 | 2S1/2 | 2 | 11 | 41282 | 299630 |
| 387.1320 | 1.28e-01 | 2.84e+09 | 1.26e-02 | 3.39e-02 | 3.44e-02 | 7.45e-02 | 2s2.2p3 | 2P1/2 | 2s.2p4 | 2P1/2 | 4 | 12 | 62438 | 320748 |
| 387.1410 | 9.44e-02 | 2.10e+09 | 9.29e-03 | 2.50e-02 | 2.54e-02 | 5.50e-02 | 2s2.2p3 | 2P3/2 | 2s.2p4 | 2P1/2 | 5 | 12 | 62444 | 320748 |
| 388.2100 | 6.81e-02 | 7.54e+08 | 7.17e-03 | 1.79e-02 | 1.82e-02 | 3.96e-02 | 2s2.2p3 | 2P1/2 | 2s.2p4 | 2P3/2 | 4 | 13 | 62438 | 320031 |
| 388.2190 | 3.15e-01 | 3.49e+09 | 3.32e-02 | 8.29e-02 | 8.43e-02 | 1.83e-01 | 2s2.2p3 | 2P3/2 | 2s.2p4 | 2P3/2 | 5 | 13 | 62444 | 320031 |
| 421.6000 | 1.99e-01 | 3.73e+09 | 7.90e-04 | 7.33e-02 | 7.52e-02 | 1.09e-01 | 2s2.2p3 | 2P1/2 | 2s.2p4 | 2S1/2 | 4 | 11 | 62438 | 299630 |
| 421.6110 | 3.78e-01 | 7.09e+09 | 1.50e-03 | 1.39e-01 | 1.43e-01 | 2.07e-01 | 2s2.2p3 | 2P3/2 | 2s.2p4 | 2S1/2 | 5 | 11 | 62444 | 299630 |
| 431.4780 | 4.07e-01 | 7.28e+09 | 4.73e-04 | 1.27e-03 | 1.31e-03 | 3.69e-02 | 2s.2p4 | 2D3/2 | 2p5 | 2P1/2 | 9 | 17 | 254105 | 485867.1 |
| 433.2310 | 7.44e-01 | 6.61e+09 | 8.63e-04 | 2.28e-03 | 2.34e-03 | 6.72e-02 | 2s.2p4 | 2D5/2 | 2p5 | 2P3/2 | 10 | 18 | 254080 | 484904.1 |
| 433.2780 | 8.61e-02 | 7.65e+08 | 9.98e-05 | 2.63e-04 | 2.70e-04 | 7.77e-03 | 2s.2p4 | 2D3/2 | 2p5 | 2P3/2 | 9 | 18 | 254105 | 484904.1 |
| 469.7760 | 6.10e-02 | 4.61e+08 | 1.74e-02 | 4.56e-02 | 4.61e-02 | 3.66e-02 | 2s2.2p3 | 2D5/2 | 2s.2p4 | 2D3/2 | 3 | 9 | 41237 | 254105 |
| 469.8310 | 8.95e-01 | 4.51e+09 | 2.74e-01 | 6.72e-01 | 6.82e-01 | 5.38e-01 | 2s2.2p3 | 2D5/2 | 2s.2p4 | 2D5/2 | 3 | 10 | 41237 | 254080 |
| 469.8750 | 5.87e-01 | 4.43e+09 | 1.68e-01 | 4.39e-01 | 4.44e-01 | 3.53e-01 | 2s2.2p3 | 2D3/2 | 2s.2p4 | 2D3/2 | 2 | 9 | 41282 | 254105 |
| 469.9300 | 5.50e-02 | 2.77e+08 | 1.68e-02 | 4.12e-02 | 4.18e-02 | 3.30e-02 | 2s2.2p3 | 2D3/2 | 2s.2p4 | 2D5/2 | 2 | 10 | 41282 | 254080 |
| 521.7390 | 8.40e-02 | 5.15e+08 | 1.75e-02 | 4.59e-02 | 4.64e-02 | 3.68e-02 | 2s2.2p3 | 2P1/2 | 2s.2p4 | 2D3/2 | 4 | 9 | 62438 | 254105 |
| 521.7560 | 1.04e-02 | 6.40e+07 | 2.18e-03 | 5.71e-03 | 5.78e-03 | 4.59e-03 | 2s2.2p3 | 2P3/2 | 2s.2p4 | 2D3/2 | 5 | 9 | 62444 | 254105 |
| 521.8240 | 1.60e-01 | 6.54e+08 | 3.59e-02 | 8.78e-02 | 8.90e-02 | 7.03e-02 | 2s2.2p3 | 2P3/2 | 2s.2p4 | 2D5/2 | 5 | 10 | 62444 | 254080 |
| 539.7420 | 3.85e-02 | 2.20e+08 | 2.31e-05 | 6.10e-05 | 6.26e-05 | 1.80e-03 | 2s.2p4 | 2S1/2 | 2p5 | 2P3/2 | 11 | 18 | 299630 | 484904.1 |
| 541.1270 | 1.87e-01 | 2.14e+09 | 3.33e-01 | 3.34e-01 | 3.34e-01 | 1.38e-01 | 2s2.2p3 | 4S3/2 | 2s.2p4 | 4P1/2 | 1 | 6 | 0 | 184800 |
| 542.0710 | 3.74e-01 | 2.12e+09 | 6.67e-01 | 6.69e-01 | 6.69e-01 | 2.75e-01 | 2s2.2p3 | 4S3/2 | 2s.2p4 | 4P3/2 | 1 | 7 | 0 | 184478 |
| 543.8870 | 5.59e-01 | 2.10e+09 | 1.00e+00 | 1.00e+00 | 1.00e+00 | 4.10e-01 | 2s2.2p3 | 4S3/2 | 2s.2p4 | 4P5/2 | 1 | 8 | 0 | 183862 |
| 603.0060 | 1.38e-01 | 1.27e+09 | 5.90e-05 | 1.59e-04 | 1.63e-04 | 4.59e-03 | 2s.2p4 | 2P3/2 | 2p5 | 2P1/2 | 13 | 17 | 320031 | 485867.1 |
| 605.6250 | 2.70e-01 | 2.45e+09 | 1.14e-04 | 3.05e-04 | 3.13e-04 | 8.84e-03 | 2s.2p4 | 2P1/2 | 2p5 | 2P1/2 | 12 | 17 | 320748 | 485867.1 |
| 606.5280 | 6.86e-01 | 3.11e+09 | 2.90e-04 | 7.65e-04 | 7.86e-04 | 2.26e-02 | 2s.2p4 | 2P3/2 | 2p5 | 2P3/2 | 13 | 18 | 320031 | 484904.1 |
| 609.1770 | 1.34e-01 | 6.04e+08 | 5.60e-05 | 1.48e-04 | 1.52e-04 | 4.36e-03 | 2s.2p4 | 2P1/2 | 2p5 | 2P3/2 | 12 | 18 | 320748 | 484904.1 |
| 1601.4380 | 0.00e+00 | 1.40e+00 | 2.31e-01 | 7.43e-03 | 7.66e-08 | 1.86e-10 | 2s2.2p3 | 4S3/2 | 2s2.2p3 | 2P3/2 | 1 | 5 | 0 | 62444 |
| 1601.5920 | 0.00e+00 | 5.64e-01 | 9.66e-02 | 1.51e-03 | 1.54e-08 | 3.76e-11 | 2s2.2p3 | 4S3/2 | 2s2.2p3 | 2P1/2 | 1 | 4 | 0 | 62438 |
| 2422.3679 | 0.00e+00 | 6.31e-03 | 1.36e-01 | 2.97e-05 | 3.01e-10 | 6.74e-13 | 2s2.2p3 | 4S3/2 | 2s2.2p3 | 2D3/2 | 1 | 2 | 0 | 41282 |
| 2425.0110 | 0.00e+00 | 6.62e-04 | 2.36e-02 | 4.66e-06 | 4.73e-11 | 1.06e-13 | 2s2.2p3 | 4S3/2 | 2s2.2p3 | 2D5/2 | 1 | 3 | 0 | 41237 |
| 4715.4331 | 0.00e+00 | 4.86e-01 | 2.72e-02 | 8.77e-04 | 9.04e-09 | 2.20e-11 | 2s2.2p3 | 2D5/2 | 2s2.2p3 | 2P3/2 | 3 | 5 | 41237 | 62444 |
| 4716.7671 | 0.00e+00 | 1.14e-01 | 6.65e-03 | 1.04e-04 | 1.06e-09 | 2.58e-12 | 2s2.2p3 | 2D5/2 | 2s2.2p3 | 2P1/2 | 3 | 4 | 41237 | 62438 |
| 4725.4600 | 0.00e+00 | 5.88e-01 | 3.29e-02 | 1.06e-03 | 1.09e-08 | 2.66e-11 | 2s2.2p3 | 2D3/2 | 2s2.2p3 | 2P3/2 | 2 | 5 | 41282 | 62444 |
| 4726.7998 | 0.00e+00 | 4.85e-01 | 2.82e-02 | 4.40e-04 | 4.50e-09 | 1.10e-11 | 2s2.2p3 | 2D3/2 | 2s2.2p3 | 2P1/2 | 2 | 4 | 41282 | 62438 |
Created by Giulio Del Zanna on Fri Sep 4 09:46:03 2009