RTModel
Real-Time Microlensing Modeling
by Valerio Bozza
KB220196
Binary
Binary lens models
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Model L1 χ2=5965.19 gMOA I=-0.119916±0.0731937 s=0.765327±0.0179581 q=0.125811±0.0220168 u0=0.215339±0.00608077 α=1.68181±0.00606389 ρ*=0.00242037±0.000447596 tE=21.3058±2.39868 t0=9704.31±0.0612159 |
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Model L2 χ2=5981.31 gMOA I=-0.0798181±0.164382 s=2.06864±0.031357 q=0.261906±0.0313856 u0=0.137103±0.0105331 α=4.59247±0.0458326 ρ*=0.00206706±0.000408838 tE=25.3037±3.2224 t0=9705.24±0.100673 |
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Model L3 χ2=6112.82 gMOA I=-0.249334±0.0740986 s=0.813367±0.0191204 q=0.115768±0.0188188 u0=0.244657±0.00732244 α=1.69646±0.0048228 ρ*=0.00275757±0.000535073 tE=18.8721±2.05148 t0=9704.24±0.0604827 |
Binary lens models with parallax
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Model X1 χ2=5746.03 gMOA I=-0.249897±0.154455 s=0.813047±0.0179841 q=0.115979±0.0305258 u0=0.244326±0.0106276 α=1.69664±0.023448 ρ*=0.002768±0.00102578 tE=18.8403±6.20983 t0=9704.24±0.250386 πE,N=-1.28089±20.0984 πE,E=-2.22937±7.95981 |
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Model X2 χ2=5752.17 gMOA I=-0.249168±0.0948121 s=0.81338±0.0177776 q=0.11584±0.0233114 u0=-0.244591±0.00646641 α=4.58661±0.00575472 ρ*=0.00276525±0.000676696 tE=18.8802±4.14085 t0=9704.24±0.141168 πE,N=1.78313±17.1954 πE,E=-1.7402±3.95997 |
Binary lens models with parallax and orbital motion
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Model O1 χ2=5746.03 gMOA I=-0.249897±0.172691 s=0.813047±0.022563 q=0.115979±0.034261 u0=0.244326±0.0113359 α=1.69664±0.0243377 ρ*=0.002768±0.00109369 tE=18.8403±7.03362 t0=9704.24±0.272423 πE,N=-1.28089±28.6489 πE,E=-2.22937±9.36656 (ds/dt)/s= -14 4.18504 10±0.0201152 dα/dt= -14 5.1756 10±0.020999 w3= -7 9.0106 10±7606.57 |