RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
KB160142
Binary or planetary (short time-scale event)
Binary lens models
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Model L1 χ2=9766.18 gMOA=-0.875029±14.4554 s=1.53683±7.47256 q=0.0389992±1.09562 u0=0.137347±1.45596 θ=5.88875±12.8202 ρ*=0.00183147±7.80454 tE=1.57602±11.0544 t0=7483.±3.58569 |
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Model L2 χ2=9810.29 gMOA=-0.821141±0.431054 s=2.87317±0.110878 q=0.140072±0.205698 u0=0.328405±0.0562406 θ=0.136232±0.0327667 ρ*=0.02133±0.0130649 tE=4.08755±0.297199 t0=7492.04±1.61414 |
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Model L3 χ2=10635. gMOA=-0.933086±0.160913 s=0.655133±0.0212281 q=0.173421±0.0773012 u0=0.422753±0.0749855 θ=4.46021±0.075447 ρ*=0.00767823±0.00370785 tE=10.9809±0.835882 t0=7493.9±0.469086 |
Point-source Point-lens model with parallax
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Model PX χ2=9803.72 gMOA=-0.489192±0.138847 u0=0.0276559±0.106493 tE=3.75071±48.6559 t0=7483.08±0.0303897 π⊥=-5.15585±188579. π||=10.±819.011 |
Point-source Point-lens model
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Model PP χ2=9804.55 gMOA=-0.48633±0.107287 u0=0.0275088±0.0827337 tE=3.77254±10.0261 t0=7483.08±0.0300445 |