RTModel
Real-Time Microlensing Modeling
by Valerio Bozza
HB200757
Binary or Planetary
Binary lens models
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Model L1 χ2=19552.5 gMOA I=-0.909305±0.203597 s=0.847006±0.0113057 q=0.0163745±0.00352982 u0=0.181074±0.0068729 α=4.92557±0.0409304 ρ*=0.00161817±0.00143604 tE=56.9818±8.65158 t0=9112.38±0.411723 |
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Model L2 χ2=19596. gMOA I=-0.908892±0.238663 s=0.855023±0.00902163 q=0.0151611±0.00253917 u0=0.152805±0.00441866 α=4.94846±0.0490445 ρ*=0.00144007±0.00130932 tE=63.7002±8.6691 t0=9112.31±0.623887 |
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Model L3 χ2=19715.8 gMOA I=-0.915156±0.285888 s=0.902035±0.00369911 q=0.0175134±0.00686944 u0=0.25932±0.0334655 α=4.86146±0.0254504 ρ*=0.00212767±0.00373149 tE=44.1831±5.36451 t0=9113.28±0.963009 |
Binary lens models with parallax
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Model X1 χ2=19512.4 gMOA I=-0.941023±0.203149 s=0.898874±0.0033619 q=0.0211135±0.0105985 u0=0.272854±0.0353883 α=4.81342±0.085748 ρ*=0.00214905±0.00262852 tE=41.1732±10.7993 t0=9113.72±0.73709 πE,N=0.0132722±3.27397 πE,E=0.32145±0.648215 |
Binary lens models with parallax and orbital motion
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Model O1 χ2=19499. gMOA I=-0.915612±0.32685 s=0.927757±0.00637432 q=0.0226453±0.00939047 u0=0.234467±0.0502368 α=4.85812±0.0795041 ρ*=0.00228465±0.00293571 tE=43.9411±10.1168 t0=9113.31±0.770328 πE,N=-0.487295±2.64552 πE,E=0.230056±0.662609 (ds/dt)/s= -6 -1.34742 10±0.00261171 dα/dt=-0.0000560067±0.00946011 w3=0.0000406684±6.41495 |