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show_pca
Visualization of principal components analysis results
Calling Sequence
show_pca(lambda, facpr, N)
Arguments
- lambda
is a p x 2 numerical matrix. In the first column we find the eigenvalues of V, where V is the correlation p x p matrix and in the second column are the ratios of the corresponding eigenvalue over the sum of eigenvalues.
- facpr
are the principal factors: eigenvectors of V. Each column is an eigenvector element of the dual of
R^p
.- N
Is a 2x1 integer vector. Its coefficients point to the eigenvectors corresponding to the eigenvalues of the correlation matrix
p
byp
ordered by decreasing values of eigenvalues. IfN
. is missing, we supposeN=[1 2]
..
Description
This function visualize the pca results.
The function produces a graphics with two subplots.
The graphics on the left represents the correlation circle. This graphics is based on the two principal components 1 and 2, i.e. the main components. For each parameter, it represents the linear correlation coefficient between the component and each parameter. Points which are close to the unit circle can be interpreted in terms of correlation, but points close to the center of the circle should not be interpreted. For the Axis 1, points on the right of the graphics are positively correlated to this component, while points on the left are negatively correlated. For the Axis 2, points on the top of the graphics are positively correlated to this component, while points on the bottom are negatively correlated. For example, if the point x1 is close to the circle, on the right, close to the Axis 1, this means that the component 1 is positively correlated to the parameter 1. When the data is perfectly represented by only two components, the points are on the circle. When more than two components are needed to represent the data, the points are inside the circle.
The graphics on the right represents the eigenvalues. The bar graph represents the eigenvalues, sorted in decreasing order. More precisely, each bar has a length equal to the ratio of the eigenvalue over the sum of the eigenvalues. The line plot represents the cumulated sum, i.e. the cumulative variances explained by the associated principal components. For example, if the cumulated sum for the eigenvalue 2 is greater than 0.9, the points are flat in a subspace associated with the two first eigenvectors: representing the data with only these two directions may be a good representation.
Implementation notes.
The right part of the graphics is based on the second column of the
lambda
output argument of the pca
function.
Examples
// Test a table of standard Normal random numbers // 100 observations in 10 dimensions. a=rand(100,10,"n"); [lambda,facpr,comprinc] = pca(a); show_pca(lambda,facpr) // See how the points are inside the circle: // more than 2 components are required to represent // the data.
// Source : "Analyse en composantes principales", // Jean-François Delmas et Saad Salam // Weight of several parts of 23 cows // X1: weight (alive) // X2: skeleton weight // X3: first grade meat weight // X4: total meat weight // X5: fat weight // X6: bones weight x = [ 395 224 35.1 79.1 6.0 14.9 410 232 31.9 73.4 8.7 16.4 405 233 30.7 76.5 7.0 16.5 405 240 30.4 75.3 8.7 16.0 390 217 31.9 76.5 7.8 15.7 415 243 32.1 77.4 7.1 18.5 390 229 32.1 78.4 4.6 17.0 405 240 31.1 76.5 8.2 15.3 420 234 32.4 76.0 7.2 16.8 390 223 33.8 77.0 6.2 16.8 415 247 30.7 75.5 8.4 16.1 400 234 31.7 77.6 5.7 18.7 400 224 28.2 73.5 11.0 15.5 395 229 29.4 74.5 9.3 16.1 395 219 29.7 72.8 8.7 18.5 395 224 28.5 73.7 8.7 17.3 400 223 28.5 73.1 9.1 17.7 400 224 27.8 73.2 12.2 14.6 400 221 26.5 72.3 13.2 14.5 410 233 25.9 72.3 11.1 16.6 402 234 27.1 72.1 10.4 17.5 400 223 26.8 70.3 13.5 16.2 400 213 25.8 70.4 12.1 17.5 ]; [lambda,facpr,comprinc] = pca(x); scf(); show_pca(lambda,facpr) // // Extract the two first columns. x = x(:,1:2); [lambda,facpr,comprinc] = pca(x); scf(); // See how the points are perfectly on the circle. show_pca(lambda,facpr)
See Also
Bibliography
Saporta, Gilbert, Probabilites, Analyse des Donnees et Statistique, Editions Technip, Paris, 2011, 3ème Edition.
Analyse en composantes principales, Jean-François Delmas et Saad Salam, http://cermics.enpc.fr/scilab_new/site/Tp/Statistique/acp/index.htm
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