More non-zero generalized eigenvalues than in theory

29 Oct 2014
2 Réponses
Réponse acceptée
Mise à jour 29 Oct 2014
4 Vues (30 jours)

0 votes

Dear all,
I'm trying to compute generalized eigenvalues. First I've tried:
[V,D]=eig(A,B);
Other attempts
[V,D]=eig(A,B,'chol');
[V,D]=eig(A,B,'qz');
[V,D]=eig(A/B);
Well, my problem is that in all cases I obtain more non-zero eigenvalues than in theory. A,B are both of 42x42 size and rank(A)=2, rank(B)=41. (By the way, in case it's useful: A and B are between- and within-scatter matrices from a k=3 multiclass Linear Discriminant Analysis, i.e. three classes/groups).
Theoretically, since rank(A)=2, I would get two non-zero eigenvalues... but results are: [3.1055, 0.9127, 0.7718, etc.] All other are indeed <1e-12. I've also tried computing the scatter matrices of my data having been first transformed to zero-mean unit-stdev, but yet I get three non-negligible eigenvalues!
I don't know where the problem is. I've verified my code (mainly to check if my computation of matrices is correct) against a given example of size 6x6, and I do get two non-zero eigenvalues as expected.
Thank you very much in advance! Best regards,
Fernando

Connectez-vous pour répondre à cette question.

 Réponse acceptée

Fernando García-García
Fernando García-García le 29 Oct 2014

0 votes

I think I've found the solution for this issue by using the intermediate output of the QZ algorithm.
[AA,BB,Q,Z,V,W] = qz(A,B,'real'); % in my case I think 'real' is safe, still needs a check
Right generalized eigenvectors are rows of W transposed. Eigenvales are:
D(i,i) = AA(i,i)/BB(i,i);
I guess that the code in eig() doesn't check if BB(i,i) has an aprox. 0 value, and numerical precision due to a 0/0 made an extra non-zero eigenvalue appear in my example data.
Let's see if I'm wrong or if anyone has a different explanation. Hope this helps!

1 commentaire
Afficher -1 commentaires plus anciens Masquer -1 commentaires plus anciens

Fernando García-García
Fernando García-García le 29 Oct 2014
Or most problably, eig() does check if approx. 0... but in my problem (with a considerable matrix dimension but low rank), I suppose I needed a greater tolerance than the default. So I implemented by hand the
D(i,i) = AA(i,i)/BB(i,i);
checking if B(i,i)>TOL. I took TOL as big as 1e-6, because values in the order of 1e-7 appear in B's diagonal for my case.

Connectez-vous pour commenter.

Plus de réponses (1)

Fernando García-García
Fernando García-García le 29 Oct 2014

0 votes

Sorry, it seems I read it wrong (maybe from an older version/implementation): Right generalized eigenvectors are rows of W, not W transposed.

Catégories

En savoir plus sur Linear Algebra dans Centre d'aide et File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by