RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
KB140069
Planetary
Binary lens models
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Model L1 χ2=14673.1 gOGLE=1.46761±0.180635 s=1.18657±0.00132356 q=0.00491125±0.000540618 u0=0.13646±0.0105543 θ=2.57808±0.031264 ρ*=0.00073099±0.0151981 tE=56.2936±0.622902 t0=6728.32±0.268861 |
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Model L2 χ2=15029.3 gOGLE=1.72196±0.342636 s=1.164±0.00100891 q=0.00372001±0.000611257 u0=0.127282±0.00913188 θ=2.55207±0.0351249 ρ*=0.000595256±0.0133617 tE=63.5838±3.98799 t0=6728.44±0.765269 |
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Model L3 χ2=15065.1 gOGLE=0.868284±0.147983 s=1.18538±0.0188727 q=0.061917±0.016143 u0=0.180477±0.0182974 θ=3.00603±0.0761 ρ*=0.00393882±0.00371978 tE=39.9053±4.37421 t0=6731.57±1.20084 |
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Model L4 χ2=15380.1 gOGLE=5.05693±0.357995 s=1.0291±0.000407126 q=0.00210057±0.0000766309 u0=0.065523±0.000877903 θ=2.70631±0.00878592 ρ*=0.000339599±0.000329368 tE=119.478±2.75062 t0=6728.26±0.116971 |
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Model L5 χ2=15407.9 gOGLE=1.99121±0.463504 s=1.1696±0.000678228 q=0.00343707±0.0023087 u0=0.113254±0.00734448 θ=2.62523±0.0450738 ρ*=0.000176484±0.231922 tE=61.53±1.33259 t0=6728.09±0.818109 |
Binary lens models with parallax
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Model X1 χ2=14589.9 gOGLE=1.30768±0.498284 s=1.18577±0.00119405 q=0.00633498±0.00140632 u0=0.145223±0.0377878 θ=2.60789±0.0833707 ρ*=0.000752576±0.0479788 tE=51.4922±0.457415 t0=6729.01±0.798052 π⊥=0.611298±0.692645 π||=0.216081±0.187641 |
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Model X2 χ2=14673.4 gOGLE=1.46796±0.511294 s=1.18653±0.00134764 q=0.00490794±0.00146818 u0=0.136442±0.0324788 θ=2.57809±0.0696148 ρ*=0.000722417±0.0454567 tE=56.2968±0.749125 t0=6728.32±0.424313 π⊥=0.000475282±0.661819 π||=0.000816277±0.148934 |