cortest.bartlett {psych} | R Documentation |
Bartlett's test that a correlation matrix is an identity matrix
Description
Bartlett (1951) proposed that -ln(det(R)*(N-1 - (2p+5)/6) was distributed as chi square if R were an identity matrix. A useful test that residuals correlations are all zero. Contrast to the Kaiser-Meyer-Olkin test.
Usage
cortest.bartlett(R, n = NULL,diag=TRUE)
Arguments
R |
A correlation matrix. (If R is not square, correlations are found and a warning is issued. |
n |
Sample size (if not specified, 100 is assumed). |
diag |
Will replace the diagonal of the matrix with 1s to make it a correlation matrix. |
Details
More useful for pedagogical purposes than actual applications. The Bartlett test is asymptotically chi square distributed.
Note that if applied to residuals from factor analysis (fa
) or principal components analysis (principal
) that the diagonal must be replaced with 1s. This is done automatically if diag=TRUE. (See examples.)
An Alternative way of testing whether a correlation matrix is factorable (i.e., the correlations differ from 0) is the Kaiser-Meyer-Olkin KMO
test of factorial adequacy.
Value
chisq |
Assymptotically chisquare |
p.value |
Of chi square |
df |
The degrees of freedom |
Author(s)
William Revelle
References
Bartlett, M. S., (1951), The Effect of Standardization on a chi square Approximation in Factor Analysis, Biometrika, 38, 337-344.
See Also
cortest.mat
, cortest.normal
, cortest.jennrich
Examples
set.seed(42)
x <- matrix(rnorm(1000),ncol=10)
r <- cor(x)
cortest.bartlett(r) #random data don't differ from an identity matrix
#data(bfi)
cortest.bartlett(bfi[1:200,1:10]) #not an identity matrix
f3 <- fa(Thurstone,3)
f3r <- f3$resid
cortest.bartlett(f3r,n=213,diag=FALSE) #incorrect
cortest.bartlett(f3r,n=213,diag=TRUE) #correct (by default)