RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB171392
Planetary
Binary lens models
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Model L1 χ2=4729.07 gOGLE=0.0584281±0.286621 s=0.926002±0.031708 q=0.000367001±0.00138911 u0=0.160803±0.0440862 θ=4.82458±0.249025 ρ*=0.001639±0.00936321 tE=20.4678±5.93318 t0=7984.92±0.467349 |
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Model L2 χ2=5359.78 gOGLE=-0.71429±2.83931 s=1.47069±0.576285 q=0.240586±0.599232 u0=0.499197±0.687425 θ=6.01068±0.452394 ρ*=0.082085±1.21327 tE=11.9847±11.9713 t0=7982.49±3.22573 |
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Model L3 χ2=5558.9 gOGLE=2.81513±0.709937 s=4.0552±0.00649671 q=0.0452518±0.00238364 u0=3.65156±0.00523285 θ=1.59582±0.00249133 ρ*=0.00998724±0.00578553 tE=211.584±37.4313 t0=7965.86±3.23627 |
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Model L4 χ2=5581.95 gOGLE=2.81771±1.45131 s=4.0552±0.0403991 q=0.0511072±0.0148634 u0=3.61231±0.0286842 θ=1.67864±0.0046242 ρ*=0.013627±0.00654657 tE=208.294±10.9102 t0=7903.9±3.82626 |
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Model L5 χ2=27806.9 gOGLE=0.17338±0.167095 s=0.654153±0.0015315 q=0.10013±0.00183659 u0=0.466585±0.0102538 θ=5.00417±0.0106809 ρ*=0.00219735±0.00230121 tE=87.9374±0.861251 t0=7910.19±0.77765 |