1 / 16

Modeling Errors in Satellite Data Yudong Tian University of Maryland & NASA/GSFC

Modeling Errors in Satellite Data Yudong Tian University of Maryland & NASA/GSFC http://sigma.umd.edu Sponsored by NASA ESDR-ERR Program. Optimal combination of independent o bservations (or how human knowledge grows). Information content. “Conservation of Information Content”.

odin
Télécharger la présentation

Modeling Errors in Satellite Data Yudong Tian University of Maryland & NASA/GSFC

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Modeling Errors in Satellite Data Yudong Tian University of Maryland & NASA/GSFC http://sigma.umd.edu Sponsored by NASA ESDR-ERR Program

  2. Optimal combination of independent observations (or how human knowledge grows) Information content

  3. “Conservation of Information Content”

  4. Why uncertainty quantification is always needed Information content

  5. The additive error model • 1. Most commonly, subconsciously used error model: • Ti: truth, error free. Xi: measurements, b: systematic error (bias) • 2. A more general additive error model:

  6. The multiplicative error model • A nonlinear multiplicative measurement error model: • Ti: truth, error free. Xi: measurements • With a logarithm transformation, • the model is now a linear, additive error model, with three parameters: • A=log(α), B=β, xi=log(Xi), ti=log(Ti)

  7. Correct error model is critical in quantifying uncertainty Xi Xi Xi Ti Ti Ti

  8. Additive model does not have a constant variance

  9. Additive error model: why variance is not constant? -- systematic errors leaking into random errors

  10. The multiplicative error model predicts better

  11. The multiplicative error model has clear advantages • Clean separation of systematic and random errors • More appropriate for measurements with several orders of magnitude variability • Good predictive skills • Tian et al., 2012: Error modeling for daily precipitation measurements: additive or multiplicative? to be submitted to Geophys. Rev. Lett.

  12. Spatial distribution of the model parameters A B σ(random error) TMI AMSR-E F16 F17

  13. Probability distribution of the model parameters A B σ TMI AMSR-E F16 F17

  14. Summary • A measurement without uncertainly is meaningless • Wrong error models produce wrong uncertainties • Multiplicative model is recommended for fine resolution precipitation measurements • Tian et al., 2012: Error modeling for daily precipitation measurements: additive or multiplicative? to be submitted to Geophys. Rev. Lett.

  15. Extra slides 15

  16. Summary and Conclusions Created bias-corrected radar data for validation Evaluated biases in PMW imagers: AMSR-E, TMI and SSMIS Constructed an error model to quantify both systematic and random errors 16

More Related