RTModel
Real-Time Microlensing Modelling by Valerio Bozza

 
OB151179
Planetary
 
Binary lens models
Model L1     χ2=208.709    gOGLE=-0.767924±33.3232

s=0.480525±3.14037    q=0.00203657±0.00553144    u0=1.69636±16.6302    θ=4.77903±0.208507    ρ*=0.0000101301±0.265018    tE=12.3784±88.1116    t0=7184.93±1.7237    
Model L2     χ2=212.956    gOGLE=5.60589±2.96843

s=2.58276±0.22788    q=0.214453±0.147668    u0=1.4302±0.0888523    θ=0.803515±0.0568735    ρ*=0.0819521±0.0247616    tE=90.9609±10.3325    t0=7301.01±2.20998    
Model L3     χ2=216.722    gOGLE=7.87202±5.07846

s=2.39549±0.390569    q=0.334065±0.186496    u0=1.21344±0.235613    θ=0.81945±0.0632411    ρ*=0.0814549±0.0384645    tE=89.6673±21.5754    t0=7277.04±1.03563    
Model L4     χ2=217.432    gOGLE=5.86571±4.34127

s=3.29146±0.0612151    q=0.194989±0.121703    u0=1.43175±0.187354    θ=2.47727±0.0452433    ρ*=0.0740411±0.0288497    tE=95.068±11.5451    t0=7000.21±3.72843    
Model L5     χ2=217.467    gOGLE=7.38951±5.79186

s=1.23889±0.148264    q=0.0188506±0.0266865    u0=0.202162±0.131579    θ=2.48729±0.258297    ρ*=0.0660001±0.12538    tE=40.3263±20.6497    t0=7182.47±1.49416