Quasinormal operator

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In statistics, the generalized linear array model(GLAM) is used for analyzing data sets with array structures. It based on the generalized linear model with the design matrix written as a Kronecker product.

Overview

The generalized linear array model or GLAM was introduced in 2006.[1] Such models provide a structure and a computational procedure for fitting generalized linear models or GLMs whose model matrix can be written as a Kronecker product and whose data can be written as an array. In a large GLM, the GLAM approach gives very substantial savings in both storage and computational time over the usual GLM algorithm.

Suppose that the data Y is arranged in a d-dimensional array with size n1×n2××nd; thus,the corresponding data vector y=vec(Y) has size n1n2n3nd. Suppose also that the design matrix is of the form

X=XdXd1X1.

The standard analysis of a GLM with data vector y and design matrix X proceeds by repeated evaluation of the scoring algorithm

XW~δXθ^=XW~δz~,

where θ~ represents the approximate solution of θ, and θ^ is the improved value of it; Wδ is the diagonal weight matrix with elements

wii1=(ηiμi)2var(yi),

and

z=η+Wδ1(yμ)

is the working variable.

Computationally, GLAM provides array algorithms to calculate the linear predictor,

η=Xθ

and the weighted inner product

XW~δX

without evaluation of the model matrix X.

Example

In 2 dimensions, let X=X2X1, then the linear predictor is written X1ΘX2 where Θ is the matrix of coefficients; the weighted inner product is obtained from G(X1)WG(X2) and W is the matrix of weights; here G(M) is the row tensor function of the r×c matrix M given by

G(M)=(M1)*(1M)

where * means element by element multiplication and 1 is a vector of 1's of length c.

These low storage high speed formulae extend to d-dimensions.

Applications

GLAM is designed to be used in d-dimensional smoothing problems where the data are arranged in an array and the smoothing matrix is constructed as a Kronecker product of d one-dimensional smoothing matrices.

References

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  1. Currie, I.D.;Durban, M.;Eilers, P. H. C. (2006) "Generalized linear array models with applications to multidimensional smoothing",Journal of the Royal Statistical Society, 68(2), 259-280.