# Generalized eigenvectors in MATLAB?

Is there a way to obtain generalized eigenvectors in case of high multiplicity of eigenvalues with a single one or at least very few commands ? In case of multiplicity 1 for each eigenvalue I can use [V,D] = eig(A), but this command doesn't work for multiple eigenvalues.

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According to Matlab documentation, [V,D] = eig(A,B) produces a diagonal matrix D of generalized eigenvalues and a full matrix V whose columns are the corresponding eigenvectors so that A*V = B*V*D

Here an example how to do it yourself... First we enter a sample matrix A:

A = [ 35  -12   4   30 ;
22   -8   3   19 ;
-10    3   0   -9 ;
-27    9  -3  -23 ];

Then we explore its characteristic polynomial, eigenvalues, and eigenvectors.

poly(A)
ans =
1.0000   -4.0000    6.0000   -4.0000    1.0000

These are the coefficients of the characteristic polynomial, which hence is (λ − 1)^4 Then

[V, D] = eigensys(A)
V =
[ 1, 0]
[ 0, 1]
[-1, 3]
[-1, 0]

D =
[1]
[1]
[1]
[1]

Thus MATLAB finds only the two independent eigenvectors

w1 = [1  0  -1  -1]';
w2 = [0  1   3   0]';

associated with the single multiplicity 4 eigenvalue λ=1 , which therefore has defect 2.
So we set up the 4x4 identity matrix and the matrix B=A-λI

Id = eye(4);
B = A - L*Id;

with L=1, When we calculate B^2 and B^3

B2 = B*B
B3 = B2*B

We find that B2 ≠ 0, but B3 = 0, so there should be a length 3 chain associated with
the eigenvalue λ = 1 . Choosing the first generalized eigenvector

u1 = [1  0  0  0]';

we calculate the further generalized eigenvectors

u2 = B*u1
u2 =
34
22
-10
-27

and

u3 = B*u2
u3 =
42
7
-21
-42

Thus we have found the length 3 chain {u3, u2, u1} based on the (ordinary) eigenvector u3. (To reconcile this result with MATLAB's eigensys calculation, you can check that u3-42w1=7w2)

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Absolutely brilliant answer. Thank you very much, this is exactly what I was looking for! –  slezadav Oct 1 '12 at 14:48
In more recent versions of Matlab, eigensys does not exist anymore. eig(sym(A)) can be used as a substitute, though the outputs won't match exactly. Also, an alternative to poly is charpoly, which returns symbolic results. –  horchler Sep 4 at 15:29