RANK-REDUCIBILITY OF A SYMMETRIC MATRIX AND SAMPLING THEORY

One of the intriguing questions of factor analysis is the extent to which one can reduce the rank of a symmetric matrix by only changing its diagonal entries. We show in this paper that the set of matrices, which can be reduced to rank r, has positive (Lebesgue) measure if and only if r is greater or equal to the Ledermann bound. In other words the Ledermann bound is shown to be almost surely the greatest lower bound to a reduced rank of the sample covariance matrix. Afterwards an asymptotic sampling theory of so-called minimum trace factor analysis (MTFA) is proposed. The theory is based on continuous and differential properties of functions involved in the MTFA. Convex analysis techniques are utilized to obtain conditions for differentiability of these functions.

[1]  W. Ledermann On the rank of the reduced correlational matrix in multiple-factor analysis , 1937 .

[2]  Walter Ledermann,et al.  I.—On a Problem concerning Matrices with Variable Diagonal Elements. , 1940 .

[3]  Louis Guttman,et al.  To what extent can communalities reduce rank? , 1958 .

[4]  A. Basilevsky,et al.  Factor Analysis as a Statistical Method. , 1964 .

[5]  N. L. Johnson,et al.  Linear Statistical Inference and Its Applications , 1966 .

[6]  E. B. Andersen,et al.  Modern factor analysis , 1961 .

[7]  James M. Ortega,et al.  Iterative solution of nonlinear equations in several variables , 2014, Computer science and applied mathematics.

[8]  P. Bentler A lower-bound method for the dimension-free measurement of internal consistency , 1972 .

[9]  Paul H. Jackson,et al.  Lower bounds for the reliability of the total score on a test composed of non-homogeneous items: II: A search procedure to locate the greatest lower bound , 1977 .

[10]  丸山 徹 Convex Analysisの二,三の進展について , 1977 .

[11]  Paul H. Jackson,et al.  Lower bounds for the reliability of the total score on a test composed of non-homogeneous items: I: Algebraic lower bounds , 1977 .

[12]  J. A. Woodward,et al.  Inequalities among lower bounds to reliability: With applications to test construction and factor analysis , 1980 .

[13]  Tom A. B. Snijders,et al.  Computational aspects of the greatest lower bound to the reliability and constrained minimum trace factor analysis , 1981 .

[14]  A. Shapiro Weighted minimum trace factor analysis , 1982 .

[15]  A. Shapiro,et al.  Minimum rank and minimum trace of covariance matrices , 1982 .