pcaiv: Principal component analysis with respect to instrumental variables

Description

performs a principal component analysis with respect to instrumental variables.

Usage

pcaiv(dudi, df, scannf = TRUE, nf = 2)
## S3 method for class 'pcaiv':
plot(x, xax = 1, yax = 2, \dots) 
## S3 method for class 'pcaiv':
print(x, \dots)
## S3 method for class 'pcaiv':
summary(object, \dots)

Arguments

dudi

a duality diagram, object of class dudi

a data frame with the same rows

scannf

a logical value indicating whether the eigenvalues bar plot should be displayed

if scannf FALSE, an integer indicating the number of kept axes

x, object

an object of class pcaiv

xax

the column number for the x-axis

yax

the column number for the y-axis

...

further arguments passed to or from other methods

Value

returns an object of class pcaiv, sub-class of class dudi
taba data frame with the modified array (projected variables)
cwa numeric vector with the column weigths (from dudi)
lwa numeric vector with the row weigths (from dudi)
eiga vector with the all eigenvalues
rankan integer indicating the rank of the studied matrix
nfan integer indicating the number of kept axes
c1a data frame with the Pseudo Principal Axes (PPA)
lia data frame dudi$ls with the predicted values by X
coa data frame with the inner products between the CPC and Y
l1data frame with the Constraint Principal Components (CPC)
callthe matched call
Xa data frame with the explanatory variables
Ya data frame with the dependant variables
lsa data frame with the projections of lines of dudi$tab on PPA
parama table containing information about contributions of the analyses : absolute (1) and cumulative (2) contributions of the decomposition of inertia of the dudi object, absolute (3) and cumulative (4) variances of the projections, the ration (5) between the cumulative variances of the projections (4) and the cumulative contributions (2), the square coefficient of correlation (6) and the eigenvalues of the pcaiv (7)
asa data frame with the Principal axes of dudi$tab on PPA
faa data frame with the loadings (Constraint Principal Components as linear combinations of X
cora data frame with the correlations between the CPC and X

encoding

latin1

References

Rao, C. R. (1964) The use and interpretation of principal component analysis in applied research. Sankhya, A 26, 329--359. Obadia, J. (1978) L'analyse en composantes explicatives. Revue de Statistique Appliquee, 24, 5--28. Lebreton, J. D., Sabatier, R., Banco G. and Bacou A. M. (1991) Principal component and correspondence analyses with respect to instrumental variables : an overview of their role in studies of structure-activity and species- environment relationships. In J. Devillers and W. Karcher, editors. Applied Multivariate Analysis in SAR and Environmental Studies, Kluwer Academic Publishers, 85--114.

Examples

Run this code

data(rhone)
pca1 <- dudi.pca(rhone$tab, scan = FALSE, nf = 3)
iv1 <- pcaiv(pca1, rhone$disch, scan = FALSE)
summary(iv1)
plot(iv1)

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