RTModel
Real-Time Microlensing Modeling by Valerio Bozza

 
HB211303
Planetary
 
Binary lens models
Model L1     χ2=3282.5    gMOA I=314.4±46.1118

s=1.01238±0.00633218    q=0.0031286±0.00119673    u0=0.0314921±0.00508118    α=0.1693±0.0175152    ρ*=0.00254716±0.00376446    tE=19.2314±2.96096    t0=9384.97±0.0853291    
Model L2     χ2=3327.6    gMOA I=256.961±41.7141

s=1.061±0.0258484    q=0.00107466±0.000556689    u0=0.0351523±0.00357142    α=0.166936±0.0261689    ρ*=0.000718139±0.0119228    tE=17.7925±2.91374    t0=9385.05±0.0624498    
Model L3     χ2=3675.1    gMOA I=378.53±217.873

s=1.12278±0.0571882    q=0.0694222±0.0290585    u0=0.0239744±0.0093612    α=4.28719±0.138688    ρ*=0.0246824±0.0188191    tE=21.272±10.2946    t0=9385.5±0.139341    
Model L4     χ2=3760.35    gMOA I=1006.47±236.146

s=0.879954±0.0332618    q=0.0029332±0.000853971    u0=0.0118548±0.00237093    α=0.181663±0.0329886    ρ*=0.00353101±0.00179158    tE=46.2266±10.7551    t0=9384.76±0.117416    
Binary lens models with parallax
Model X1     χ2=3260.19    gMOA I=316.25±58.4369

s=1.01299±0.00691994    q=0.00307695±0.00123832    u0=-0.0310157±0.0058611    α=6.11945±0.0384327    ρ*=0.00260488±0.00401773    tE=19.2416±3.38383    t0=9384.98±0.0954962    
πE,N=-1.24594±42.8233    πE,E=-1.83364±61.2715