RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
KB190130
Binary
Binary lens models
 |
Model L1 χ2=7891.71 gOGLE I=4.0002±1.25891 s=1.85461±0.0025137 q=0.874459±0.0117932 u0=0.0534678±0.00104245 α=3.26211±0.00187031 ρ*=0.000812563±0.000858332 tE=80.8068±0.244018 t0=8637.22±0.32055 |
 |
Model L2 χ2=7968.27 gOGLE I=4.18634±1.03367 s=1.82097±0.00169526 q=0.602921±0.0094411 u0=0.0410221±0.00169229 α=3.27853±0.00274816 ρ*=0.000764113±0.00117358 tE=84.079±0.225801 t0=8626.9±0.31878 |
 |
Model L3 χ2=11110. gOGLE I=3.60217±1.04878 s=1.14673±0.000408521 q=0.344486±0.00135898 u0=0.339995±0.000317493 α=3.45553±0.000531384 ρ*=0.000221339±0.000342845 tE=235.507±0.379345 t0=8600.84±0.0763911 |
Binary lens models with parallax
 |
Model X1 χ2=7603.91 gOGLE I=4.28152±1.09839 s=1.84461±0.00819669 q=0.90434±0.00917698 u0=0.0590604±0.00425277 α=3.25892±0.00354239 ρ*=0.000854515±0.00208683 tE=80.676±0.473989 t0=8638.67±0.417953 πE,N=-0.00739517±0.0610503 πE,E=-0.0172751±0.0364826 |
 |
Model X2 χ2=7604.89 gOGLE I=4.38417±1.44462 s=1.8518±0.00209793 q=0.872736±0.00660311 u0=-0.0541384±0.0011899 α=3.02236±0.00319609 ρ*=0.000781283±0.00197159 tE=81.0406±0.403614 t0=8637.25±0.501537 πE,N=0.0260985±0.0564743 πE,E=0.0299093±0.0379509 |
Binary lens models with parallax and orbital motion
 |
Model O1 χ2=7588.51 gOGLE I=4.41662±1.63113 s=1.80738±0.00354149 q=0.625156±0.0111997 u0=0.0487022±0.00376991 α=3.27584±0.00239973 ρ*=0.000472789±0.0014536 tE=84.2622±0.137751 t0=8628.67±2.01423 πE,N=0.0054084±0.0944798 πE,E=-0.0393374±0.100184 (ds/dt)/s= -7 2.66913 10±0.000218352 dα/dt= -7 5.43012 10±0.000117724 w3= -7 1. 10±1.85156 |