Dear All,
I am not a statistician, and was wondering if anyone could help me
with the following.
Greenacre, in his Correspondence Analysis in Practice (1993, p.173)
gives a method for testing the significance of an axis in CA where:
$\chi^2 = \lambda \times n$ where \lambda is the the eigenvalue for
the principal axis and n is the number of objects in the
analysis. The value for \chi^2 is then compared to a table of
critical values. The table in his book is a subset of Table 51 in
Pearson and Hartley 1976, Biometrica Tables for Statisticians vol II,
described as "Percentage points of the extreme roots of
$|\text{\textbf{S}}\Sigma^{-1}-c\text{\textbf{I}}|=0$"
Is there an easy way of doing this test in R? My main problem in
that Table 51 only gives values for a maximum of a p=10, \nu = 200
table and mine are regularly much bigger than that (although it would
be also nice to be able to put in the figures for lambda, n, p and
\nu and get the probability back).
Many thanks in advance, Kris Lockyear.
Dr Kris Lockyear
Institute of Archaeology
31-34 Gordon Square
London
phone: 020 7679 4568
email: [EMAIL PROTECTED]
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