Confused by SVD and Eigenvector Decomposition in PCA
Hi Feng, AFIK SVD analysis provides a one-step method for computing all the components of the eigen value problem, without the need to compute and store big covariance matrices. And also the resulting decomposition is computationally more stable and robust. Cheers, Antonio Rodriguez ----- Original Message ----- From: "Feng Zhang" <f0z6305 at labs.tamu.edu> To: "R-Help" <r-help at stat.math.ethz.ch> Sent: Thursday, February 06, 2003 7:03 PM Subject: [R] Confused by SVD and Eigenvector Decomposition in PCA
Hey, All In principal component analysis (PCA), we want to know how many
percentage
the first principal component explain the total variances among the
data.
Assume the data matrix X is zero-meaned, and I used the following procedures: C = covriance(X) %% calculate the covariance matrix; [EVector,EValues]=eig(C) %% L = diag(EValues) %%L is a column vector with eigenvalues as the
elements
percent = L(1)/sum(L); Others argue using Sigular Value Decomposition(SVD) to calculate the same quantity, as: [U,S,V]=svd(X); L = diag(S); L = L.^2; percent = L(1)/sum(L); So which way is the correct method to calculate the percentage
explained by
the first principal component? Thanks for your advices on this. Fred
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