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2 - Application of geostatistics in subsurface hydrology
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- By F. Javier Samper Calvete, Universidad de La Coruña
- Edited by Gedeon Dagan, Tel-Aviv University, Shlomo P. Neuman, University of Arizona
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- Book:
- Subsurface Flow and Transport
- Published online:
- 04 December 2009
- Print publication:
- 04 September 1997, pp 44-61
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- Chapter
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Summary
ABSTRACT Geostatistics is a theory that was developed in the 1960s to deal with the analysis and estimation of spatially distributed variables having a stochastic spatial structure. Initially it was applied to mining engineering, but later found interesting applications in many other fields such as subsurface hydrology A brief description of the geostatistical theory and a review of the most commonly applied geostatistical methods is first presented. Most relevant properties of the spatial correlation structure of some selected hydrogeological variables, including permeability, transmissivity and hydraulic head are described. Early applications of geostatistics in subsurface hydrology dealt with estimating hydrogeological variables at unsampled locations by means of point kriging and obtaining the corresponding map of estimation errors. Block kriging has been generally used to estimate block transmissivities in numerical flow models. With the increasing recognition of the paramount effects of spatial variability, geostatistical simulation gained more and more relevance. The particular properties of hydrogeological data (scarcity, variable support, measurement errors) compelled hydrogeologists to develop improved methods for estimating both drift and spatial covariance parameters. Geostatistical methods have been applied recently also to analyze hydrochemical and isotopic data. Another group of geostatistical applications in subsurface hydrology is related to optimum monitoring and observation network design.
INTRODUCTION
Geostatistics, a term coined by the French statistician G. Matheron of the Ecole des Mines Superieur de Paris in France, is a theory dealing with the estimation of regionalized variables. A regionalized variable (ReV) is any function z(x) that depends on the spatial location x and that exhibits a stochastic spatial structure.