Eigenvectors of A'*A for non-square matrix A

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Urs Hackstein
Urs Hackstein le 19 Mai 2021
Réponse apportée : Jaynik le 1 Mar 2024
Let A be a non-square matrix. How can we determine the eigenvector associated with the minimum eigenvalue of the matrix A'*A?
In that paper, it is suggested to use "svd"-function, but how exactly?
  1 commentaire
David Goodmanson
David Goodmanson le 19 Mai 2021
Hi Urs, you can look up the svd on wikipedia and go to 'Relation to eigenvalue decomposition'

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Jaynik
Jaynik le 1 Mar 2024
Hi,
If you have the matrix A, you can directly use the "eig" function to obtain the eigen vector associated with the minimum eigen value. Following is the code to do the same:
B = A'*A;
[V, D] = eig(B);
[min_eigenvalue, index] = min(diag(D)); % The diagonal of D contains the eigenvalues.
min_eigenvector = V(:, index); % The corresponding column in V is the associated eigenvector.
Alternatively, the "svd" function provides the singular values, which are the square roots of the non-negative eigenvalues of A'*A, and the right singular vectors: Following code can be used for the same:
[U, S, V] = svd(A'*A);
[~, minIndex] = min(diag(S)); % The diagonal elements of S are the square roots of eigenvalues.
min_eigenvector = V(:, minIndex);
You can refer the following documentation to read more about these functions:
Hope this helps!

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