RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB171187
Planetary
Binary lens models
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Model L1 χ2=4647.5 gOGLE=2.50875±0.856901 s=0.927811±0.0182325 q=0.0147758±0.00721042 u0=0.128493±0.0272779 θ=0.0437337±0.159801 ρ*=0.00851497±0.0137687 tE=17.7299±4.04822 t0=7939.1±0.623518 |
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Model L2 χ2=4682.76 gOGLE=3.20741±1.05345 s=0.935937±0.0108967 q=0.0104192±0.00618384 u0=0.109844±0.0242497 θ=6.28181±0.13024 ρ*=0.00426314±0.00796208 tE=19.9722±4.50862 t0=7939.1±0.46612 |
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Model L3 χ2=4692.55 gOGLE=3.7288±1.21945 s=1.12636±0.0239588 q=0.00717604±0.00310978 u0=0.0868248±0.0251757 θ=2.42562±0.217308 ρ*=0.00834431±0.00899189 tE=22.8128±3.967 t0=7939.84±0.650126 |
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Model L4 χ2=4714.49 gOGLE=3.32855±4.69388 s=0.358972±0.344987 q=0.707551±3.3531 u0=0.104127±0.127971 θ=5.37298±0.70689 ρ*=0.0666148±0.0899585 tE=23.3204±25.4732 t0=7940.63±1.07205 |
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Model L5 χ2=4717.59 gOGLE=3.64996±4.572 s=3.04199±0.734798 q=0.210588±0.225507 u0=0.215923±0.209731 θ=3.82014±0.208429 ρ*=0.0456741±0.0713947 tE=25.3004±22.6127 t0=7949.49±4.52208 |