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Comparison of Variance Estimators for Two-dimensional, Spatially-structured Sample Designs. Don L. Stevens, Jr. Susan F. Hornsby* Department of Statistics Oregon State University. Designs and Models for. Aquatic Resource Surveys. DAMARS. R82-9096-01.
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Comparison of Variance Estimators for Two-dimensional, Spatially-structured Sample Designs. Don L. Stevens, Jr. Susan F. Hornsby* Department of Statistics Oregon State University
Designs and Models for Aquatic Resource Surveys DAMARS R82-9096-01 The research described in this presentation has been funded by the U.S. Environmental Protection Agency through the STAR Cooperative Agreement CR82-9096-01 Program on Designs and Models for Aquatic Resource Surveys at Oregon State University. It has not been subjected to the Agency's review and therefore does not necessarily reflect the views of the Agency, and no official endorsement should be inferred
Preview • Widely accepted that a more or less regular pattern of points (e.g., systematic sampling) is more efficient than SRS • A variety of variance estimators for estimated mean are available for 1-dimensional systematic sampling • We will examine the behavior of some variance estimators for 2-dimensional systematic and spatially-balanced (not necessarily regular) designs
Variance Estimators • Wolter (1985) identified eight 1-dimensional variance estimators for 1-dimensional systematic sampling • D’Orazio (2003) extended three of these to 2-dimensional systematic sampling • Stevens & Olsen (2003) developed an estimator for 2-dimensional spatially-balanced samples
Simulation Study • D’Orazio used simulation to compare estimators on a lattice generated from a Gaussian random field using several covariance functions • 32 x 32 lattice • Calculated variance estimator for all 16 possible 8 x 8 samples • Generated the random field using the Gaussian Random Field package in R
Simulation Study • Replicate D’Orazio’s study for the exponential covariance model, with the addition of the NBH estimator • Check the behavior of the estimators on a spatially-patterned surface that is not stationary.
Variance Estimators • Simplest approach: assume SRS:
Variance Estimators • Horizontal stratification
Variance Estimators • Vertical stratification
Variance Estimators • 1st Order autocorrelation correction • 1-dimension , the Durbin-Watson statistic
Variance Estimators • 1st Order autocorrelation correction • 2-dimension , Geary’s c index of spatial autocorrelation
Variance Estimators • Cochran’s Autocorrelation Correction • 1-dimension
Variance Estimators • Cochran’s Autocorrelation Correction • 2-dimension • Use Moran’s I in place of in formula for w
Stevens & Olsen NeighborhoodEstimator • General form for variable probability, continuous population Di is the set of neighbors for point i
Stevens & Olsen NeighborhoodEstimator Weights are chosen so that Weights are a decreasing function of distance, and vanish outside of local neighborhood and wij =0 for jDi
Stevens & Olsen NeighborhoodEstimator • For constant probability, finite population
Conclusions • The hs, vs, ac, and nbh estimators all seem to work reasonably well for both the GRF and patchy surfaces • The nbh estimator seems to give coverages that are a bit closer to nominal than the hs, vs, or ac estimators • The nbh works for variable probability, spatially constrained designs for which the other estimators do not.