RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB131125
Planetary (with parallax effect and possible orbital motion)
Binary lens models with parallax and orbital motion
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Model O1 χ2=11742.4 gOGLE=0.0109519±0.328727 s=1.03386±0.103181 q=0.00437913±0.00382523 u0=0.178064±0.0513294 θ=2.43373±0.0872955 ρ*=0.00842134±0.00925476 tE=31.0407±6.76674 t0=6564.16±0.317501 π⊥=0.636844±1.11715 π||=-0.835037±0.563111 ds/dt=0.00140923±0.018353 dθ/dt=0.001091±0.00792909 w3=0.0224934±0.0526742 |
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Model O2 χ2=25606.6 gOGLE=-0.302311±0.378077 s=0.838181±0.0270963 q=0.00160172±0.000395097 u0=-0.246874±0.0734589 θ=0.975021±0.156538 ρ*=0.017014±0.00818762 tE=25.9432±5.43852 t0=6564.19±0.27564 π⊥=0.745391±0.774416 π||=-1.42899±0.858516 ds/dt=0.000311864±0.00461828 dθ/dt=0.000315901±0.0241038 w3=0.000917852±0.346695 |
Binary lens models with parallax
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Model X1 χ2=11717.8 gOGLE=0.00934461±0.273646 s=1.03796±0.0512485 q=0.00374835±0.00322068 u0=0.178384±0.0418936 θ=2.4331±0.0609677 ρ*=0.00731288±0.00484747 tE=30.9516±6.07842 t0=6564.13±0.325503 π⊥=0.606783±1.15726 π||=-0.863168±0.556745 |
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Model X2 χ2=12723.5 gOGLE=0.253449±0.193776 s=1.24883±0.0300392 q=0.002798±0.001095 u0=0.14864±0.0251254 θ=2.46268±0.081839 ρ*=0.003347±0.00476232 tE=35.8429±4.89412 t0=6564.03±0.183241 π⊥=0.499953±1.54799 π||=-0.53951±0.38619 |
Binary lens models
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Model L1 χ2=13707.2 gOGLE=0.836809±0.117005 s=0.986948±0.0369658 q=0.00193906±0.00184105 u0=0.106844±0.00843909 θ=2.46999±0.0399777 ρ*=0.00279561±0.00448369 tE=48.4098±3.10209 t0=6563.86±0.300555 |
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Model L2 χ2=13941.1 gOGLE=0.870198±0.112907 s=1.21625±0.0487568 q=0.002206±0.00176268 u0=0.104579±0.00780323 θ=2.46956±0.0341645 ρ*=0.002454±0.00458431 tE=49.2232±2.91948 t0=6563.9±0.231358 |