RTModel
Real-Time Microlensing Modelling
by Valerio Bozza
OB160241
Planetary
Binary lens models
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Model L1 χ2=9975.24 gOGLE=-0.0971943±0.347962 s=2.27004±0.532686 q=0.0317147±0.0277918 u0=0.0107945±0.0101669 θ=2.9106±0.0203703 ρ*=0.0087781±0.00372854 tE=36.5994±11.3738 t0=7493.41±2.06332 |
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Model L2 χ2=10257.1 gOGLE=-0.0826604±0.266768 s=0.463029±0.0931902 q=0.0310768±0.0218876 u0=0.0243435±0.00769517 θ=2.90747±0.0280963 ρ*=0.00817859±0.00502332 tE=37.9493±9.21105 t0=7491.46±0.0684604 |
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Model L3 χ2=10861.3 gOGLE=0.18989±0.260495 s=0.496412±0.0450385 q=0.0520633±0.0172331 u0=0.0191577±0.00644387 θ=2.99348±0.0509275 ρ*=0.0157955±0.00402571 tE=46.7035±11.0486 t0=7491.04±0.134704 |
Binary lens models with parallax
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Model X1 χ2=9871.91 gOGLE=-0.102743±0.542534 s=2.27604±0.559996 q=0.0317333±0.033969 u0=0.0108892±0.0116808 θ=2.90654±0.106842 ρ*=0.00902757±0.00442839 tE=36.612±18.1253 t0=7493.41±2.22041 π⊥=0.464659±9.60182 π||=0.22867±0.949249 |
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Model X2 χ2=9882.41 gOGLE=-0.10232±0.471157 s=2.27585±0.383921 q=0.0317354±0.0273065 u0=-0.0108347±0.00823572 θ=3.37582±0.104352 ρ*=0.0089601±0.0064713 tE=36.6419±15.9773 t0=7493.41±1.51771 π⊥=-0.363529±9.44139 π||=0.208038±1.01427 |