RTModel
Real-Time Microlensing Modeling
by Valerio Bozza
KB200135
Planetary
Binary lens models
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Model L1 χ2=9381.84 gMOA I=4203.95±1719.73 s=1.12855±0.562855 q=0.000201325±0.00106665 u0=0.0330043±0.0141619 α=2.36087±0.240874 ρ*=0.00769473±0.0116525 tE=16.5747±5.56635 t0=9040.49±0.0508484 |
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Model L2 χ2=9402.67 gMOA I=4941.41±2001.73 s=1.54768±0.672783 q=0.0170241±0.0122835 u0=0.0535862±0.0256872 α=4.51849±0.329413 ρ*=0.0470943±0.0191227 tE=18.8548±6.08618 t0=9040.56±0.127652 |
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Model L3 χ2=9512.04 gMOA I=5195.09±2687.21 s=0.323036±0.114802 q=0.156354±0.183827 u0=0.0349162±0.0183682 α=0.417698±0.324658 ρ*=0.040578±0.0233033 tE=19.8015±8.73876 t0=9040.54±0.0620512 |
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Model L4 χ2=9593.16 gMOA I=5767.97±398.78 s=4.0552±0.125003 q=0.80263±0.0138707 u0=0.163939±0.0168912 α=3.22699±0.00889322 ρ*=0.0250575±0.00353146 tE=25.4568±0.90501 t0=9083.6±0.453278 |
Binary lens models with parallax
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Model X1 χ2=9366.98 gMOA I=4213.±4268.64 s=1.13037±0.86623 q=0.000204519±0.00151632 u0=0.0329493±0.0336197 α=2.36062±0.31988 ρ*=0.00766345±0.0127343 tE=16.6533±13.4205 t0=9040.49±0.0671601 πE,N=2.99987±146.412 πE,E=-0.916021±57.8045 |
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Model X2 χ2=9373.27 gMOA I=4198.47±3133.75 s=1.12982±0.592893 q=0.000199199±0.00107146 u0=-0.033013±0.0252746 α=3.9203±0.254316 ρ*=0.00756819±0.0124625 tE=16.5146±10.355 t0=9040.49±0.0538782 πE,N=3.±161.378 πE,E=-1.72362±57.5973 |