论文信息 - Two generalizations of the common principal component model

Two generalizations of the common principal component model

SUMMARY Under the common principal component model the covariance matrices Ti of k populations are assumed to have identical eigenvectors, that is, the same orthogonal matrix diagonalizes all Ti simultaneously. This paper modifies the common principal component model by assuming that only q out of p eigenvectors are common to all Ti,, while the remaining p - q eigenvectors are specific in each group. This is called a partial common principal component model. A related modification assumes that q eigenvectors of each matrix span the same subspace, a problem that was first considered by Krzanowski (1979). For both modifications this paper derives the normal theory maximum likelihood estimators. It is shown that approximate maximum likelihood estimates can easily be computed if estimates of the ordinary common principal component model are available. The methods are illustrated by numerical examples.

B. Flury | Bernhard K. Flury

[1] B. Flury. Common Principal Components in k Groups , 1984 .

[2] Wojtek J. Krzanowski,et al. Between-group comparison of principal components — some sampling results , 1982 .

[3] Asymptotic theory for common principal component analysis , 1986 .

[4] Wojtek J. Krzanowski,et al. Principal Component Analysis in the Presence of Group Structure , 1984 .

[5] W. Gautschi,et al. An algorithm for simultaneous orthogonal transformation of several positive definite symmetric matrices to nearly diagonal form , 1986 .

[6] B. Flury,et al. Proportionality of k covariance matrices , 1986 .

[7] W. Krzanowski. Between-Groups Comparison of Principal Components , 1979 .

[8] P. Jolicoeur,et al. Size and shape variation in the painted turtle. A principal component analysis. , 1960, Growth.

[9] G. Constantine,et al. The F‐G Diagonalization Algorithm , 1985 .

[10] T. W. Anderson. ASYMPTOTIC THEORY FOR PRINCIPAL COMPONENT ANALYSIS , 1963 .