RTModel
Real-Time Microlensing Modelling by Valerio Bozza

 
OB150051
Planetary
 
Binary lens models
Model L1     χ2=9434.46    gOGLE=-0.0216393±0.966118

s=0.946759±0.132832    q=0.00639018±0.00656909    u0=0.222524±0.192464    θ=4.07935±0.152845    ρ*=0.0440447±0.037234    tE=10.7774±5.85409    t0=7083.07±0.272596    
Model L2     χ2=10642.4    gOGLE=0.827948±0.932989

s=1.03199±0.0516397    q=0.00473668±0.00392409    u0=0.120534±0.0748819    θ=0.388385±0.0848392    ρ*=0.0383169±0.0356077    tE=14.5509±6.51005    t0=7083.2±0.372326    
Model L3     χ2=11198.2    gOGLE=2.95698±0.746424

s=3.03628±0.0243298    q=0.281551±0.0548492    u0=2.13918±0.0971686    θ=1.56942±0.0216513    ρ*=0.0278078±0.0149124    tE=46.8019±8.07697    t0=7083.3±2.07337    
Model L4     χ2=11481.1    gOGLE=0.18576±0.377433

s=4.05519±0.367167    q=0.192444±0.0425731    u0=0.991851±0.155271    θ=2.797±0.0204531    ρ*=0.0796628±0.0246467    tE=26.9748±3.21701    t0=7002.34±1.16032    
Model L5     χ2=11638.5    gOGLE=0.36359±0.441519

s=4.05487±0.311589    q=0.301684±0.0932002    u0=0.985267±0.108682    θ=2.76453±0.0231269    ρ*=0.0808923±0.0341915    tE=24.405±3.05714    t0=7017.04±1.18264