RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB131118
Planetary
Binary lens models
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Model L1 χ2=7863.13 gOGLE=9.52888±12.2964 s=1.15995±0.239124 q=0.00087639±0.00455141 u0=0.195163±0.201708 θ=1.69437±0.0949405 ρ*=0.00166712±0.0045209 tE=36.9183±35.4916 t0=6475.62±0.608309 |
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Model L2 χ2=8011.85 gOGLE=-0.976694±0.304418 s=3.9231±0.106819 q=0.000124582±0.000245925 u0=3.70365±0.097793 θ=1.63384±0.0259758 ρ*=0.082085±0.0896869 tE=4.36411±1.32673 t0=6475.25±0.611908 |
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Model L3 χ2=8152.86 gOGLE=-0.969503±0.218804 s=3.65321±0.0523752 q=0.000173992±0.00026171 u0=3.43592±0.0226707 θ=1.64014±0.0333366 ρ*=0.0807637±0.0413601 tE=4.75443±1.42929 t0=6475.22±0.389931 |
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Model L4 χ2=8190.33 gOGLE=-0.957629±0.207049 s=3.35593±0.101501 q=0.00026907±0.0004437 u0=3.11073±0.0687283 θ=1.63349±0.0368417 ρ*=0.0818695±0.0520767 tE=4.88814±1.49532 t0=6475.34±0.238816 |
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Model L5 χ2=8583.42 gOGLE=13.1152±5.10526 s=0.70744±0.098185 q=0.119217±0.110366 u0=-0.129304±0.0321363 θ=2.50433±0.216123 ρ*=0.00294998±0.00315178 tE=46.306±25.8349 t0=6474.15±1.73374 |