克立格估计的分析解释与协方差函数的代数确定

边少锋; MenzJoachim

Volume 25 Issue 2

Mar. 2000

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BIAN Shaofeng, Menz Joachim, 2000. ANALYTICAL INTERPRETATION TO KRIGING ESTIMATION AND ALGEBRAIC DETERMINATION OF COVARIANCE FUNCTION'S PARAMETER. Earth Science, 25(2): 195-200.

Citation:

BIAN Shaofeng, Menz Joachim, 2000. ANALYTICAL INTERPRETATION TO KRIGING ESTIMATION AND ALGEBRAIC DETERMINATION OF COVARIANCE FUNCTION'S PARAMETER. Earth Science, 25(2): 195-200.

BIAN Shaofeng, Menz Joachim, 2000. ANALYTICAL INTERPRETATION TO KRIGING ESTIMATION AND ALGEBRAIC DETERMINATION OF COVARIANCE FUNCTION'S PARAMETER. Earth Science, 25(2): 195-200.

Citation:

BIAN Shaofeng, Menz Joachim, 2000. ANALYTICAL INTERPRETATION TO KRIGING ESTIMATION AND ALGEBRAIC DETERMINATION OF COVARIANCE FUNCTION'S PARAMETER. Earth Science, 25(2): 195-200.

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ANALYTICAL INTERPRETATION TO KRIGING ESTIMATION AND ALGEBRAIC DETERMINATION OF COVARIANCE FUNCTION'S PARAMETER

BIAN Shaofeng¹,
Menz Joachim²

1.
The Surveying and Geophysical Institute of Chinese Academy of Sciences, Wuhan, 430077, China
2.
TU Bergakademie Freiberg, 09599 Freiberg, Germany

Received Date: 1999-01-30
Publish Date: 2000-03-25

Abstract

Abstract

The analytical interpretation to Kriging estimation and the algebraic determination of a covariance function's parameter are presented. This paper first introduces the concept of function approximation using a rotating surface as a basic function. Then it is demonstrated that the universal Kriging may be expressed as the traditional weighted least square fitting and as the function approximation with a rotating surface as a basic function. It is also demonstrated that the parameter of a covariance function (i.e. a rotating surface) can be determined by the mathematical analysis on a certain condition (i.e. a highly continuous lump goldree effect in a random field). Finally, this paper presents two principles for the determination of a covariance function's parameter with the Gaussian function as an example: one is formulated through analysis of the linear combinations of the shifted Gaussian functions, and the other is derived from the equivalence between Bplines and Gaussian functions.
- Kriging estimation,
- covariance function,
- geostatistics

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References(6)

References

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