RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB180740
Planetary
Binary lens models
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Model L1 χ2=13907.7 gOGLE I=6.03315±14.0732 s=1.05942±0.145104 q=0.0111597±0.0462163 u0=0.213574±0.402577 α=0.80385±0.544369 ρ*=0.018872±0.069493 tE=15.5079±23.9467 t0=8253.99±1.76945 |
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Model L2 χ2=14391.4 gOGLE I=21.1013±4.86054 s=2.16298±0.0910806 q=0.540449±0.107552 u0=0.0177207±0.0129974 α=3.21149±0.0000131351 ρ*=0.0243278±0.00866578 tE=17.2768±2.12826 t0=8261.54±0.796632 |
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Model L3 χ2=14405.7 gOGLE I=0.37691±0.684567 s=0.652395±0.0990422 q=0.0120842±0.0168531 u0=0.704068±0.204457 α=4.37987±0.227419 ρ*=0.0246665±0.201059 tE=6.26461±2.36583 t0=8254.19±0.979071 |
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Model L4 χ2=14509. gOGLE I=23.833±7.85043 s=2.30952±0.114885 q=0.586017±0.139258 u0=0.027912±0.0243631 α=3.21236±0.0556175 ρ*=0.0216958±0.0135962 tE=20.9107±2.07255 t0=8265.83±1.50967 |
Binary lens models with parallax
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Model X1 χ2=13861.5 gOGLE I=9.00598±5.33027 s=1.05159±0.0539814 q=0.0043±0.0119717 u0=-0.159378±0.0668666 α=5.54427±1.03894 ρ*=0.004306±0.0273967 tE=18.4761±21.176 t0=8254.32±1.20097 πE,N=2.98824±163.042 πE,E=-0.915857±30.8121 |
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Model X2 χ2=13900.1 gOGLE I=6.95025±17.4907 s=1.03788±0.0879597 q=0.009877±0.0600998 u0=0.187464±0.38115 α=0.75012±0.613527 ρ*=0.015906±0.101348 tE=15.7192±28.1476 t0=8254.16±1.58943 πE,N=2.9997±109.508 πE,E=-2.99175±27.3747 |
Binary lens models with parallax and orbital motion
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Model O1 χ2=13861.4 gOGLE I=8.98523±22.4702 s=1.05158±0.252764 q=0.004301±0.0431877 u0=-0.159422±0.3013 α=5.5442±1.8622 ρ*=0.004255±0.0866434 tE=18.4679±51.0874 t0=8254.32±1.6223 πE,N=3.±255.989 πE,E=-0.883929±34.0145 (ds/dt)/s=0.000016±0.763031 dα/dt=0.000064±0.328047 w3= -6 1. 10±7903.04 |