An overview of the Interpolation toolset
Tools to predict values at unmeasured locations.
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Tool |
Description |
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Uses the measured values surrounding the prediction location to predict a value for any unsampled location, based on the assumption that things that are close to one another are more alike than those that are farther apart. |
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Uses a kernel that is based upon the heat equation and allows one to use a combination of raster and feature datasets to act as a barrier. |
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Empirical Bayesian Kriging is an interpolation method that accounts for the error in estimating the underlying semivariogram through repeated simulations. |
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Fits a smooth surface that is defined by a mathematical function (a polynomial) to the input sample points. |
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A moving window predictor that uses the shortest distance between points so that points on either side of the line barriers are connected. |
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Fits the specified order (zero, first, second, third, and so on) polynomial, each within specified overlapping neighborhoods, to produce an output surface. |
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Recalculates the Range, Nugget, and Partial Sill semivariogram parameters based on a smaller neighborhood, moving through all location points. |
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Uses one of five basis functions to process each measured sample value, thus creating an exact interpolation surface. |