Abstract
Sample schemes used in geostatistical surveys must be suitable for both variogram estimation and kriging. Previously schemes have been optimized for one of these steps in isolation. Ordinary kriging generally requires the sampling locations to be evenly dispersed over the region. Variogram estimation requires a more irregular pattern of sampling locations since comparisons must be made between measurements separated by all lags up to and beyond the range of spatial correlation. Previous studies have not considered how to combine these optimized schemes into a single survey and how to decide what proportion of sampling effort should be devoted to variogram estimation and what proportion devoted to kriging
An expression for the total error in a geostatistical survey accounting for uncertainty due to both ordinary kriging and variogram uncertainty is derived. In the same manner as the kriging variance, this expression is a function of the variogram but not of the sampled response data. If a particular variogram is assumed the total error in a geostatistical survey may be estimated prior to sampling. We can therefore design an optimal sample scheme for the combined processes of variogram estimation and ordinary kriging by minimizing this expression. The minimization is achieved by spatial simulated annealing. The resulting sample schemes ensure that the region is fairly evenly covered but include some close pairs to analyse the spatial correlation over short distances. The form of these optimal sample schemes is sensitive to the assumed variogram. Therefore a Bayesian approach is adopted where, rather than assuming a single variogram, we minimize the expected total error over a distribution of plausible variograms. This is computationally expensive so a strategy is suggested to reduce the number of computations required
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Abt, M., 1999, Estimating the prediction mean squared error in Gaussian stochastic processes with exponential correlation structure: Scand. Jour. Statist., v. 26, no. 4, p. 563–578.
Abt, M., Welch, W. J., and Sacks, J., 1999, Design and analysis for modelling and predicting spatial contamination: Math. Geol., v. 31, no. 1, p. 1–22.
Bogaert, P., and Russo, D., 1999, Optimal spatial sampling design for the estimation of the variogram based upon a least squares approach: Water Resour. Res., v. 35, no. 4, p. 1275–1289.
Deutsch, C. V., and Journel, A. G., 1998, GSLIB: Geostatistical software library and users guide, 2nd ed.: Oxford University Press, New York, 369 p.
Dobson, A. J., 1990, An introduction to generalized linear models, 2nd ed.: Chapman and Hall, London, 174 p.
Heuvelink, G. B. M., 1998, Error propagation in environmental modelling with GIS: Taylor, Francis, London, 127 p.
Heuvelink, G. B. M., Brus, D. J., and De Gruijter, J. J., 2004, Optimization of sample configurations for digital soil mapping with universal kriging: Proceedings of Global Workshop on Digital Soil Mapping, INRA, Montpellier.
Journel, A. G., and Huijbregts, C. J., 1978, Mining geostatistics: Academic Press, London, 600 p.
Kitanidis, P. K., 1987, Parametric estimation of covariances of regionalised variables: Water Resources Bulletin, v. 23, no. 4, p. 557–567.
Lark, R. M., 2000, Estimating variograms of soil properties by the method-of-moments and maximum likelihood: Eur. Jour. Soil Sci., v. 51, no. 4, p. 717–728.
Lark, R. M., 2002, Optimized spatial sampling of soil for estimation of the variogram by maximum likelihood: Geoderma, v. 105, no. 1–2, p. 49–80.
Marchant, B. P., and Lark, R. M., 2004, Estimating variogram uncertainty: Math. Geology, v. 36, no. 8, p. 867–898.
Müller, W. G., and Zimmerman, D. L., 1999, Optimal designs for variogram estimation: Environmetrics, v. 10, no. 1, p. 23–37.
Pardo-Igúzquiza, E., 1997, MLREML: A computer program for the inference of spatial covariance parameters by maximum likelihood and restricted maximum likelihood: Comput. & Geosciences, v. 23, no. 2, p. 153–162.
Pardo-Igúzquiza, E., 1998, Maximum likelihood estimation of spatial covariance parameters: Math. Geol., v. 30, no. 1, p. 95–108.
Pardo-Igúzquiza, E., and Dowd, P. A., 2001a, Variance-covariance matrix of the experimental variogram: Assessing variogram uncertainty: Math. Geol., v. 33, no. 4, p. 397–419.
Pardo-Igúzquiza, E., and Dowd, P. A., 2001b, VARIOG2D: A computer program for estimating the semi-variogram and its uncertainty: Comput. & Geosciences, v. 27, no. 5, p. 549–561.
Pardo-Igúzquiza, E., and Dowd, P. A., 2003, Assessment of the uncertainty of spatial covariance parameters of soil properties and its use in applications: Soil Sci., v. 168, no. 11, p. 769–782.
Russo, D., 1984, Design of an optimal sampling network for estimating the variogram: Soil Sc. Soc. Am. J., v. 48, no. 4, p. 708–716.
Todini, E., 2001, Influence of parameter estimation uncertainty in Kriging: Part 1-Theoretical development: Hydrol. Earth Sci. Syst., v. 5, no. 2, p. 215–223.
Todini, E., and Ferraresi, M., 1996, Influence of parameter estimation uncertainty in Kriging: J. Hydrol., v. 175, no. 4, p. 555–566.
van Groenigen, J. W., Siderius, W., and Stein, A., 1999, Constrained optimisation of soil sampling for minimisation of the kriging variance: Geoderma v. 87, no. 3–4, p. 239–259.
van Groenigen, J. W., 2000, The influence of variogram parameters on optimal sampling schemes for mapping by kriging: Geoderma v. 97, no. 3–4, p. 223–236.
Warrick, A. W., and Myers, D. E., 1987, Optimization of sampling locations for variogram calculations: Water Resour. Res., v. 23, no. 3, p. 496–500.
Webster, R., and Oliver, M. A., 2001 Geostatistics for Environmental Scientists: John Wiley, Chichester 217p.
Zimmerman, D. L., and Cressie, N., 1992, Mean squared prediction error in the spatial linear model with estimated covariance parameters: Ann. Inst. Statist. Math. v. 44, no. 1, p. 27–43.
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Marchant, B.P., Lark, R.M. Optimized Sample Schemes for Geostatistical Surveys. Math Geol 39, 113–134 (2007). https://doi.org/10.1007/s11004-006-9069-1
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11004-006-9069-1