RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB170406
Planetary
Binary lens models
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Model L1 χ2=12576.4 gOGLE=-0.0540793±0.0848763 s=0.893013±0.0299509 q=0.00105995±0.000508982 u0=0.0108901±0.00121726 θ=2.06787±0.103409 ρ*=0.00739803±0.001579 tE=32.7015±2.80407 t0=7908.81±0.0111169 |
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Model L2 χ2=12748.6 gOGLE=-0.0309662±0.0863949 s=1.09544±0.0326345 q=0.000540378±0.00019296 u0=0.01019±0.00105768 θ=2.17325±0.0674845 ρ*=0.00575276±0.00108162 tE=33.3273±2.91865 t0=7908.81±0.00977317 |
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Model L3 χ2=12804.5 gOGLE=-0.0679268±0.0816946 s=1.15083±0.0628088 q=0.00123407±0.00030942 u0=0.0108414±0.000982479 θ=2.04195±0.0818735 ρ*=0.00793769±0.00156677 tE=32.2741±2.59703 t0=7908.82±0.0106233 |
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Model L4 χ2=13158.2 gOGLE=-0.0953634±0.09594 s=0.231812±0.073103 q=0.0598507±0.047961 u0=0.0118742±0.00153393 θ=3.85028±0.106455 ρ*=0.00829803±0.00149038 tE=31.5982±2.96291 t0=7908.81±0.011645 |
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Model L5 χ2=13625.9 gOGLE=-0.13415±0.0695249 s=4.0552±0.210737 q=0.0536133±0.00440057 u0=0.135983±0.00257791 θ=3.83353±0.0878564 ρ*=0.00878801±0.00156363 tE=31.1681±2.08613 t0=7913.46±0.954009 |
Binary lens models with parallax
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Model X1 χ2=11585.8 gOGLE=0.0346245±0.117889 s=0.917645±0.0359269 q=0.000627247±0.000247316 u0=0.00982724±0.00122833 θ=2.14832±0.0854592 ρ*=0.00584084±0.00129161 tE=35.0219±3.73723 t0=7908.81±0.0102847 πE,N=3.±3.79279 πE,E=1.29158±1.29803 |
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Model X2 χ2=11593.3 gOGLE=0.0475611±0.0884 s=1.09587±0.0365436 q=0.000506586±0.000158438 u0=-0.00952046±0.000840512 θ=4.11101±0.0685357 ρ*=0.0053792±0.00103788 tE=35.5431±2.99998 t0=7908.81±0.00983736 πE,N=3.±2.66959 πE,E=1.23757±0.125675 |