Data filter

from
to
Wavelength: [Å]  
Energy: cm-1  
Show autoionization states:  
Maximum n:  
Maximum l:  
Group by multiplicity:  
Show prohibited lines (by multiplicity):  
Show prohibited lines (by parity):  
Level grouping: By term
By J
No grouping
Auto
  
Diagram width: px  
 

W VII U[cm-1]0984100 311441 318185.2 645238.4 320692.7 645943.5 322527 646596.4 327044 648071.9 328019.8 648557.6 329949.6 649400.8 330824.9 649982.2 333095.4 649662.1 335017.1 650367.2 315259 318899 647462 335016.9 651541.7 335171.5 650474.3 340530 652661.6 343305.1 653949.9 354110.8 656165 382577.2 658366.6 462496.3 740964 335411.4 662412.7 337853.6 663215 339628.6 339704.6 665762.5 343093.3 664542.6 345393.5 665444.6 346384.7 666176.6 348370.2 351599.8 667393.6 352478.4 437188.1 675863.8 438026 676159 443237.3 678949 446748.9 680153.4 531465 766776 454566.3 693250.3 455220.6 693468.2 0 647862 647578 646733 646673 646444 645907 645867 645507 643880 643569 642481 630395 630282 629962 632406 632838 629791 629102 628672 628049 627487 627053 626581 626291 626025 553588 552670.8 551684.3 549865.3 531433.6 530488.9 550081.6 543641.1 539126.5 538902.7 519194.4 517073.8 536420.1 534837.9 534427.8 533693.3 513640.4 512881.8 ~~ 390850 539150 687450 835750 4f13(2F07/2)5p6nd (7/2,3/2)o2 4f13(2F07/2)5p65d , j=2 (7/2,3/2)o5 4f13(2F07/2)5p65d , j=5 4f13(2F07/2)5p66d , j=5 (7/2,3/2)o3 4f13(2F07/2)5p65d , j=3 4f13(2F07/2)5p66d , j=3 (7/2,3/2)o4 4f13(2F07/2)5p65d , j=4 4f13(2F07/2)5p66d , j=4 (7/2,5/2)o6 4f13(2F07/2)5p65d , j=6 4f13(2F07/2)5p66d , j=6 (7/2,5/2)o2 4f13(2F07/2)5p65d , j=2 4f13(2F07/2)5p66d , j=2 (7/2,5/2)o4 4f13(2F07/2)5p65d , j=4 4f13(2F07/2)5p66d , j=4 (7/2,5/2)o1 4f13(2F07/2)5p65d , j=1 4f13(2F07/2)5p66d , j=1 (7/2,5/2)o3 4f13(2F07/2)5p65d , j=3 4f13(2F07/2)5p66d , j=3 (7/2,5/2)o5 4f13(2F07/2)5p65d , j=5 4f13(2F07/2)5p66d , j=5 4f145p5nd 2P03/2 (3/2,3/2)o0 4f145p5(2P03/2)5d , j=0 (3/2,3/2)o1 4f145p5(2P03/2)5d , j=1 4f145p5(2P03/2)6d , j=1 (3/2,3/2)o2 4f145p5(2P03/2)5d , j=2 4f145p5(2P03/2)6d , j=2 (3/2,3/2)o3 4f145p5(2P03/2)5d , j=3 4f145p5(2P03/2)6d , j=3 (3/2,5/2)o4 4f145p5(2P03/2)5d , j=4 4f145p5(2P03/2)6d , j=4 (3/2,5/2)o2 4f145p5(2P03/2)5d , j=2 4f145p5(2P03/2)6d , j=2 (3/2,5/2)o3 4f145p5(2P03/2)5d , j=3 4f145p5(2P03/2)6d , j=3 (3/2,5/2)o1 4f145p5(2P03/2)5d , j=1 4f145p5(2P03/2)6d , j=1 2P01/2 (1/2,3/2)o1 4f145p5(2P01/2)5d , j=1 4f145p5(2P01/2)6d , j=1 4f13(2F05/2)5p6nd (5/2,3/2)o4 4f13(2F05/2)5p65d , j=4 4f13(2F05/2)5p66d , j=4 (5/2,3/2)o2 4f13(2F05/2)5p65d , j=2 4f13(2F05/2)5p66d , j=2 (5/2,5/2)o0 4f13(2F05/2)5p65d , j=0 (5/2,3/2)o1 4f13(2F05/2)5p65d , j=1 4f13(2F05/2)5p66d , j=1 (5/2,3/2)o3 4f13(2F05/2)5p65d , j=3 4f13(2F05/2)5p66d , j=3 (5/2,5/2)o1 4f13(2F05/2)5p65d , j=1 4f13(2F05/2)5p66d , j=1 (5/2,5/2)o5 4f13(2F05/2)5p65d , j=5 4f13(2F05/2)5p66d , j=5 (5/2,5/2)o2 4f13(2F05/2)5p65d , j=2 (5/2,5/2)o3 4f13(2F05/2)5p65d , j=3 4f13(2F05/2)5p66d , j=3 (5/2,5/2)o4 4f13(2F05/2)5p65d , j=4 4f13(2F07/2)5p6ns (7/2,1/2)o4 4f13(2F07/2)5p66s , j=4 4f13(2F07/2)5p67s , j=4 (7/2,1/2)o3 4f13(2F07/2)5p66s , j=3 4f13(2F07/2)5p67s , j=3 4f145p5ns 2P03/2 (3/2,1/2)o2 4f145p5(2P03/2)6s , j=2 4f145p5(2P03/2)7s , j=2 (3/2,1/2)o1 4f145p5(2P03/2)6s , j=1 4f145p5(2P03/2)7s , j=1 2P01/2 (1/2,1/2)o1 4f145p5(2P01/2)6s , j=1 4f145p5(2P01/2)7s , j=1 4f13(2F05/2)5p6ns (5/2,1/2)o2 4f13(2F05/2)5p66s , j=2 4f13(2F05/2)5p67s , j=2 (5/2,1/2)o3 4f13(2F05/2)5p66s , j=3 4f13(2F05/2)5p67s , j=3 4f145p6 1S0 4f145p6 , j=0 4f13(2F05/2)5p65f (5/2,7/2)5 4f13(2F05/2)5p65f , j=5 (5/2,7/2)4 4f13(2F05/2)5p65f , j=4 (5/2,5/2)4 4f13(2F05/2)5p65f , j=4 (5/2,7/2)3 4f13(2F05/2)5p65f , j=3 (5/2,5/2)2 4f13(2F05/2)5p65f , j=2 (5/2,7/2)2 4f13(2F05/2)5p65f , j=2 (5/2,5/2)3 4f13(2F05/2)5p65f , j=3 (5/2,7/2)6 4f13(2F05/2)5p65f , j=6 (5/2,7/2)1 4f13(2F05/2)5p65f , j=1 (5/2,5/2)5 4f13(2F05/2)5p65f , j=5 (5/2,5/2)1 4f13(2F05/2)5p65f , j=1 4f13(2F07/2)5p65f (7/2,7/2)5 4f13(2F07/2)5p65f , j=5 (7/2,7/2)6 4f13(2F07/2)5p65f , j=6 (7/2,7/2)2 4f13(2F07/2)5p65f , j=2 4f13(2F07/2)5p65f , j=2 4f13(2F07/2)5p65f , j=2 (7/2,7/2)4 4f13(2F07/2)5p65f , j=4 (7/2,7/2)3 4f13(2F07/2)5p65f , j=3 (7/2,5/2)5 4f13(2F07/2)5p65f , j=5 (7/2,5/2)4 4f13(2F07/2)5p65f , j=4 (7/2,7/2)7 4f13(2F07/2)5p65f , j=7 (7/2,5/2)3 4f13(2F07/2)5p65f , j=3 (7/2,7/2)1 4f13(2F07/2)5p65f , j=1 (7/2,5/2)6 4f13(2F07/2)5p65f , j=6 (7/2,5/2)2 4f13(2F07/2)5p65f , j=2 4f13(2F05/2)5p66p (5/2,3/2)3 4f13(2F05/2)5p66p , j=3 (5/2,3/2)2 4f13(2F05/2)5p66p , j=2 (5/2,3/2)4 4f13(2F05/2)5p66p , j=4 (5/2,3/2)1 4f13(2F05/2)5p66p , j=1 (5/2,1/2)2 4f13(2F05/2)5p66p , j=2 (5/2,1/2)3 4f13(2F05/2)5p66p , j=3 4f145p56p 2P03/2 (3/2,3/2)0 4f145p5(2P03/2)6p , j=0 (3/2,3/2)2 4f145p5(2P03/2)6p , j=2 (3/2,3/2)3 4f145p5(2P03/2)6p , j=3 (3/2,3/2)1 4f145p5(2P03/2)6p , j=1 (3/2,1/2)2 4f145p5(2P03/2)6p , j=2 (3/2,1/2)1 4f145p5(2P03/2)6p , j=1 4f13(2F07/2)5p66p (7/2,3/2)4 4f13(2F07/2)5p66p , j=4 (7/2,3/2)3 4f13(2F07/2)5p66p , j=3 (7/2,3/2)2 4f13(2F07/2)5p66p , j=2 (7/2,3/2)5 4f13(2F07/2)5p66p , j=5 (7/2,1/2)4 4f13(2F07/2)5p66p , j=4 (7/2,1/2)3 4f13(2F07/2)5p66p , j=3 261.387 223.846 216.219 289.526 302.272 130.416 313.573 188.159 294.376 154.448 134.959 147.025 150.203 151.889 150.275 153.848 752.124 751.527 751.262 489.064 747.854 755.837 491.151 758.009 755.589 753.428 752.389 736.583 737.041 758.827 732.534 731.972 739.059 743.512 745.97 744.442 743.67 746.199 768.808 824.221 788.96 779.617 475.333 837.073 854.418 860.277 857.091 469.556 776.473 773.011 482.443 763.254 761.727 761.412 766.466 766.932 770.978 731.335 768.549 759.884 715.617 617.156 616.436 615.32 513.553 617.765 621.28 671.787 658.546 625.961 614.402 516.779 529.003 530.872 536.918 537.516 521.569 597 613.571 613.571 612.456 673.574 504.608 716.01 499.261 861.732 715.191 717.131 498.48 730.59 729.754 726.774 714.896 711.339 705.3 703.377 697.423 693.909 705.562 707.607 710.24 709.085 707.96 730.803 470.511 918.909 913.052 335.021 918.964 923.484 912.191 336.599 904.688 338.114 906.544 906.825 907.639 967.743 332.762 1140.533 1085.143 326.01 1232.365 321.478 1380.339 328.758 330.278 332.172 1421.97 1032.078 463.979 903.113 963.199 872.891 901.276 444.95 873.421 874.289 454.535 870.901 865.213 864.787 865.4 869.21 870.901 876.198 871.667 883.065 880.787 885.72 888.699 884.696 885.11 886.735 878.69 879.364 896.502 877.599 549.283 568.537 605.755 1354.341 1335.899 571.331 1322.495 596.679 1328.575 575.475 577.66 585.39 563.553 559.834 560.318 559.002 1321.113 556.212 557.973 1435.863 561.074 551.444 563.939 563.473 562.713 561.76 562.222 567.849 1032.935 1026.169 1024.069 1036.219 1036.662 1042.877 1037.327 1019.322 1016.603 980.98 549.09 989.109 995.975 1009.883 1007.742 1045.306 1049.333 1262.511 1256.008 1300.94 1308.002 1316.533 1312.109 1252.168 1245.772 1081.515 1070.58 1091.704 1232.009 626.843 1317.119 524.847 338.999 338.897 338.869 338.679 339.036 339.242 339.841 339.827 339.424 338.543 338.543 336.094 335.23 334.939 334.311 336.58 336.852 337.863 337.829 337.045 340.183 340.215 471.672 467.864 467.521 464.018 473.559 473.692 475.551 475.072 474.195 463.547 462.379 447.632 345.709 341.377 340.535 453.527 458.222 461.679 461.535 458.343 334.278 334.172 324.563 324.51 324.243 324.054 324.62 324.663 326.414 325.455 325.355 322.719 322.072 318.856 317.981 317.879 316.845 321.101 321.211 322.072 321.698 321.211 326.644 326.644 331.533 331.19 330.278 330.193 331.699 332.135 333.509 332.842 332.842 329.773 329.651 327.513 327.513 327.31 328.27 328.38 329.651 329.339 328.676 475.655 477.15 512.621 511.99 511.628 511.262 516.589 517.698 520.324 519.118 518.275 510.498 510.12 503.776 503.621 503.533 503.335 504.194 506.606 509.526 509.128 508.718 520.723 522.647 540.496 537.351 535.767 534.233 540.946 542.957 546.26 544.393 543.413 533.877 533.633 525.338 523.251 523.085 526.218 527.625 533.258 531.551 530.956 501.996 501.866 489.478 488.072 487.29 487.095 489.931 490.303 491.823 491.608 490.812 486.302 485.935 479.405 479.331 478.063 477.635 483.518 483.912 485.363 484.48 484.334 493.898 495.081 499.787 499.16 498.654 497.49 500.444 500.835 501.472 501.439 501.31 497.338 497.246 496.293 495.68 495.503 496.427 496.52 496.897 496.837 496.689 546.649 W VII U[eV]0122 ~~ 48.5 66.8 85.2 103.6