RTModel
Real-Time Microlensing Modelling by Valerio Bozza

 
OB161195
Planetary
 
Binary lens models
Model L1     χ2=6077.97    gOGLE=1.06465±0.547771

s=1.09507±0.117098    q=0.0000685637±0.000131023    u0=0.0586969±0.0211153    θ=2.17846±0.0432498    ρ*=0.00313989±0.00538684    tE=8.91118±2.85164    t0=7568.77±0.0199621    
Model L2     χ2=6298.88    gOGLE=1.3931±0.483641

s=1.01619±0.00183619    q=0.00143527±0.000983571    u0=0.0513431±0.01478    θ=3.15177±0.145935    ρ*=0.00311789±0.00238373    tE=10.1626±2.59578    t0=7568.8±0.0228791    
Model L3     χ2=6999.82    gOGLE=1.0186±0.421241

s=0.961442±0.033692    q=0.0000824797±0.000077815    u0=0.0608154±0.0171239    θ=5.5626±0.0699956    ρ*=0.0157736±0.00547392    tE=8.73141±2.18933    t0=7568.78±0.0207029    
Model L4     χ2=7184.73    gOGLE=1.18677±0.680404

s=0.957393±0.0423461    q=0.000332137±0.000239274    u0=0.0571525±0.024941    θ=4.75866±0.114693    ρ*=0.03104±0.0115306    tE=9.30563±3.43535    t0=7568.77±0.0212956    
Model L5     χ2=7245.86    gOGLE=1.35658±0.364197

s=0.92251±0.157502    q=0.00376179±0.00259831    u0=0.069438±0.0152127    θ=2.6043±0.237528    ρ*=0.0809159±0.0156889    tE=9.71402±1.78769    t0=7568.8±0.0357871