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This research proposes a new method for accurately detecting precipitation over land using multichannel data. The algorithm applies thresholding and retrieval techniques to reduce environmental contamination and improve precipitation retrievals. Examples of strategies include reducing uncertainty in surface emissivity, separating precipitation signatures from surface variability, and utilizing polarization to reduce sensitivity to water fraction.
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Locally Optimized Precipitation Detection over Land Grant Petty Atmospheric and Oceanic Sciences University of Wisconsin - Madison
The Old View RetrievalAlgorithm Raining Pixels All Pixels Screening Operator Non-Raining Pixels • Operator(s) classify pixels • rain vs. no rain • snow vs. rain, etc. • “Detection” is front-end to retrieval algorithms • But: Just because pixel is “raining” doesn’t mean that it is free of environmental contamination!
A New View Thresholding and/or RetrievalAlgorithm Precipitationsignal(s) All channels+ancillary data Decoupling Operator(s) Environmentalnoise • Classification/screening of pixels, when needed, reduces to thresholding of the extracted signal. • Cleanly separated signals can then be post-processed into actual retrievals; environmental contamination is greatly reduced.
Example: Utilization of dual-polarization TB over ocean S=0 no scattering P=0 opaque cloud 300 Warm-cloudrain P=0.6 LWP = min Cold-cloud rain TB,H P=1 cloud free Snow,no rain Cloud-freeocean 150 150 300 TB,V S=10 K
Applicability to Land Retrievals Need analogous multichannel operators/techniques to decouple (not merely flag) precipitation signatures from background variability (spatial and temporal). • Problem surfaces range from desert sand to snow-covered ground. • Some methods have been demonstrated in prototype form but never developed further.
Examples of strategies over land using microwave imagers • Databases, models, and/or retrievals to reduce uncertainty in surface emissivity • Multichannel (e.g., eigenvector) methods to separate precip signatures from surface variability (e.g, Conner and Petty 1998; Bauer 2002) • Use of polarization to reduce sensitivity to water fraction (e.g., Spencer et al. 1989) • Optimal estimation methods - not widely used yet!
Linear estimation methods • Traditional Minimum Variance - find linear operator that minimizes mean-squared error in retrieved quantity. • Requires: Noise covariance and linearized forward model or statistical regression using real or modeled data. • Problem: This method balances noise amplification against scaling errors -- always underestimates magnitude of desired signal, especially when signal-to-noise ratio is poor.
Linear estimation methods (cont.) • Eigenvector methods - find linear operator that captures signature of precipitation. Then subtract the components that are parallel to the the first one or two noise covariance eigenvectors to eliminate their contribution. • Requires: Eigenvectors of noise covariance and linearized forward model. • Problem: Reduces geophysical noise but does not necessarily minimize it.
Linear estimation methods (cont.) • Constrained optimization - find linear operator that retains properly scaled response to precipitation signature while minimizing mean-squared error. • Requires: Noise covariance and linearized forward model. • Problem: Hardly anyone in our business has heard of it!
Preliminary Experiments with Constrained Optimization • Generate N-dimensional histograms of multichannel TBs for each 1x1 degree geographical grid box and each calendar month. • Sort bins in order of decreasing density. • Identify first M bins that account for 80% of all pixels, thus excluding “rare” events such as precipitation. M is location-dependent. • Compute channel means and NxN covariances from pixels falling in the above bins for each month; combine for entire calendar year 2002 • Use physical model to obtain multichannel signature vectors (linear) as function of mean background TB • Use constrained optimization to find unbiased linear operator and estimate associated geophysical noise.
Comparison of background noise susceptibility for TMI - global fixed vs. locally optimized linear operators
Examples of actual precipitation detection using constrained optimal estimation!!
Examples of actual precipitation detection using constrained optimal estimation!! ?
Examples of actual precipitation detection using constrained optimal estimation!! ? Last weekend, a nearby lightning strike took out our 7-terabyte RAID along with all of our TMI and AMSR-E swath data and other critical files!
Examples of actual precipitation detection using constrained optimal estimation!! ? Last weekend, a nearby lightning strike took out our 7-terabyte RAID along with all of our TMI and AMSR-E swath data and other critical files! Consequently, even I have not yet seen COE applied to swath data yet. :(
Conclusions • The availability of local background channel covariances can be exploited to find linear operators that maximum the signal-to-noise ratio of a desired signature (e.g., precip). • Helps solve • Coastline problem • Desert problem • Snow problem? • Method will be initially tested using TMI in order to take advantage of PR as validation. • Adaptation to AMSR-E is in progress and will serve as a more challenging test (high latitude, cold season land).
