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For locations ${\displaystyle x_{1},x_{2},\ldots ,x_{N}\in D}$  the variance of every linear combinations

${\displaystyle X=\sum _{i=1}^{N}w_{i}Z(x_{i})}$ 

can be computed by

${\displaystyle var(X)=\sum _{i=1}^{N}\sum _{i=1}^{N}w_{i}C(x_{i},x_{j})w_{j}}$ 

A function is a valid covariance function if and only if ^[2] this variance is non-negative for all possible choices of N and weights ${\displaystyle w_{1},\ldots ,w_{N}}$ . A function with this property is called positive definite.

In case of a second order stationary random field, where

${\displaystyle C(x_{i},x_{j})=C(x_{i}+h,x_{j}+h)}$ 

for any lag ${\displaystyle h}$ , the covariance function can represented by a one parameter function

${\displaystyle C_{s}(h)=C(0,h)=C(x,x+h)}$ 

which is called covariogram or also covariance function. Implicitly the ${\displaystyle C(x_{i},x_{j})}$  can be computed from ${\displaystyle C_{s}(h)}$  by:

${\displaystyle C(x,y)=C_{s}(y-x)}$ 

The positive definitness of the single argument version of the covariance function can be checked by Bochner's theorem. ^[3]

Variogram Random Field Stochastic Process Kriging