Filed under: Spatial Models
GLMM with spatial correlation, where the locations do not lie on a grid. Illustrates how you can parameterize a large correlation matrix in terms of an isotropic correlation function r(d), where "d" is the distiance between two locations.
Our data are 100 Poisson counts (y), each with parameter lambda. The datapoints are index by i and j (i,j=1,...,10). It is assumed that
where Xi,jb is a linear predictor and ei,j are Gaussian random variables with covariance
Here d is the Euclidean distance between the two positions.
This example shows a mathematical trick that is useful in all sorts of regression analysis: make the columns of the design matrix X orthogonal. This makes the model more stable, but when you later shall interpret the output (b vector) you must "transform back".
DATA_SECTION
matrix dd(1,n,1,n); // Distance matrix
LOC_CALCS
int i, j;
dmatrix tX=trans(X);
ncol1=norm(tX(1));
tX(1)/=ncol1;
tX(2)-= tX(1)*tX(2)*tX(1);
cout << tX(1)*tX(2) << endl;
ncol2=norm(tX(2));
tX(2)/=ncol2;
X=trans(tX);
END_CALCS
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