RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB190109
Planetary
Binary lens models with parallax
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Model X1 χ2=54590.4 gOGLE I=0.394599±0.333892 s=0.792279±0.143912 q=0.00129153±0.000797737 u0=0.0220973±0.00695542 α=1.14739±0.0690832 ρ*=0.00794446±0.00272626 tE=43.5482±12.3562 t0=8580.76±0.0365024 πE,N=0.451439±1.89296 πE,E=0.0582913±0.626588 |
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Model X2 χ2=54652.5 gOGLE I=0.334364±0.269222 s=0.788176±0.141408 q=0.00137002±0.000915956 u0=-0.0230851±0.00560233 α=5.13466±0.0712694 ρ*=0.00823637±0.0023933 tE=41.942±9.60966 t0=8580.76±0.0365662 πE,N=-0.0000516242±2.54037 πE,E= -7 -8.25696 10±0.625426 |
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Model X3 χ2=58160.6 gOGLE I=0.327793±0.606403 s=0.249482±0.240776 q=0.0865235±0.148764 u0=0.0232568±0.0146909 α=5.6566±0.314841 ρ*=0.0000102473±0.283777 tE=41.8985±19.9705 t0=8580.77±0.128979 πE,N=0.140382±16.5074 πE,E=0.0953763±0.869577 |
Binary lens models
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Model L1 χ2=54652.5 gOGLE I=0.334364±0.193404 s=0.788176±0.114091 q=0.00137002±0.000809403 u0=0.0230851±0.00431446 α=1.14852±0.0714554 ρ*=0.00823638±0.00244488 tE=41.942±6.97523 t0=8580.76±0.036261 |
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Model L2 χ2=54713.8 gOGLE I=0.339212±0.147591 s=1.28986±0.166576 q=0.00131356±0.00069024 u0=0.0223767±0.00312502 α=1.1508±0.0680203 ρ*=0.00816198±0.00223814 tE=42.1423±5.51729 t0=8580.75±0.0346044 |
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Model L3 χ2=58216. gOGLE I=0.260096±0.2826 s=0.27087±0.17202 q=0.076121±0.0974717 u0=0.0246003±0.00780169 α=5.62827±0.249235 ρ*=0.00034549±0.00103352 tE=40.1375±9.39135 t0=8580.78±0.0950456 |