Get the eigenvalue of a known eigenvector

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Sam R
Sam R on 21 Nov 2017
Commented: Matt J on 22 Nov 2017
I have a matrix M1 of 784x784, where each column is an eigenvector. I am looking for a way to get the eigenvalues for each eigenvector and store them in another matrix M2 of 784x1.
The matrix M3 is a matrix of 784x300. M1 contains eigenvectors of M3.
  1 Comment
Matt J
Matt J on 22 Nov 2017
The matrix M3 is a matrix of 784x300. M1 contains eigenvectors of M3.
Non-square matrices cannot have eigenvectors.

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Answers (1)

John D'Errico
John D'Errico on 21 Nov 2017
What basic property do you know about the eigenvalues and eigenvectors? Come on, if you are using them, you ought to know!
If v is en eigenvector of the matrix A, then what do you know about A*v? How does that product relate to the original vector v?
If each column of the matrix V is an eigenvector, then what does A*V give you? Can you determine the eigenvalues from that product?
  2 Comments
Sam R
Sam R on 21 Nov 2017
Edited: Sam R on 21 Nov 2017
Well, I'm trying to do basically this in Matlab, but I keep getting another matrix instead of a scalar as a result of the division.
So basically
v1 = [1; 0; 1];
v2 = A*v1;
Which would make
v2 = [2; 0; 2];
Then I thought I'd get the eigenvalue by doing
l = v2./v1;
But it gives me a column vector, and I need a scalar.
Not really sure how to do this in Matlab.
Torsten
Torsten on 22 Nov 2017
Edited: Torsten on 22 Nov 2017
Search for a nonzero component i in v1 and calculate l as
l = v2(i)/v1(i)
Best wishes
Torsten.

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