Conditioning Simulations of Gaussian Random Fields by Ordinary Kriging

Abstract Conditioning realizations of stationary Gaussian random fields to a set of data is traditionally based on simple kriging. In practice, this approach may be demanding as it does not account for the uncertainty in the spatial average of the random field. In this paper, an alternative model is presented, in which the Gaussian field is decomposed into a random mean, constant over space but variable over the realizations, and an independent residual. It is shown that, when the prior variance of the random mean is infinitely large (reflecting prior ignorance on the actual spatial average), the realizations of the Gaussian random field are made conditional by substituting ordinary kriging for simple kriging. The proposed approach can be extended to models with random drifts that are polynomials in the spatial coordinates, by using universal or intrinsic kriging for conditioning the realizations, and also to multivariate situations by using cokriging instead of kriging.

[1]  R. Adler RANDOM FIELDS AND THEIR GEOMETRY , 2003 .

[2]  A. Yaglom,et al.  An Introduction to the Theory of Stationary Random Functions , 1963 .

[3]  P. Delfiner,et al.  Linear Estimation of non Stationary Spatial Phenomena , 1976 .

[4]  Chantal de Fouquet,et al.  Reminders on the Conditioning Kriging , 1994 .

[5]  X. Emery Simple and Ordinary Multigaussian Kriging for Estimating Recoverable Reserves , 2005 .

[6]  Massimo Guarascio,et al.  Advanced Geostatistics in the Mining Industry , 1977 .

[7]  H. Omre Bayesian kriging—Merging observations and qualified guesses in kriging , 1987 .

[8]  A. Journel,et al.  Geostatistics for natural resources characterization , 1984 .

[9]  Katherine Campbell,et al.  Introduction to disjunctive kriging and non-linear geostatistics , 1994 .

[10]  Xavier Emery,et al.  Testing the correctness of the sequential algorithm for simulating Gaussian random fields , 2004 .

[11]  Timothy C. Coburn,et al.  Geostatistics for Natural Resources Evaluation , 2000, Technometrics.

[12]  Jacques Rivoirard,et al.  Two key parameters when choosing the kriging neighborhood , 1987 .

[13]  M. Stein Estimating and choosing , 1989 .

[14]  Brian D. Ripley,et al.  Stochastic Simulation , 2005 .

[15]  X. Emery Multigaussian kriging for point-support estimation: incorporating constraints on the sum of the kriging weights , 2006 .

[16]  J. Chilès,et al.  Geostatistics: Modeling Spatial Uncertainty , 1999 .

[17]  Margaret Armstrong,et al.  Comparison between different kriging estimators , 1989 .

[18]  Daniel Guibal,et al.  Local Estimation of the Recoverable Reserves: Comparing Various Methods with the Reality on a Porphyry Copper Deposit , 1984 .

[19]  Xavier Emery Ordinary multigaussian kriging for mapping conditional probabilities of soil properties , 2006 .

[20]  Henning Omre,et al.  The Bayesian bridge between simple and universal kriging , 1989 .

[21]  Christian Lantuéjoul,et al.  Non Conditional Simulation of Stationary Isotropic Multigaussian Random Functions , 1994 .

[22]  C. R. Dietrich,et al.  A fast and exact method for multidimensional gaussian stochastic simulations , 1993 .

[23]  M. W. Davis,et al.  Production of conditional simulations via the LU triangular decomposition of the covariance matrix , 1987, Mathematical Geology.

[24]  X. Emery Variograms of Order ω: A Tool to Validate a Bivariate Distribution Model , 2005 .