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I am looking to solve a problem of the type: Aw = xBw where x is a scalar (eigenvalue), w is an eigenvector, and A and B are symmetric, square numpy matrices of equal dimension. I should be able to find d x/w pairs if A and B are d x d. How would I solve this in numpy? I was looking in the Scipy docs and not finding anything like what I wanted.

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2 Answers 2

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For real symmetric or complex Hermitian dense matrices, you can use scipy.linalg.eigh() to solve a generalized eigenvalue problem. To avoid extracting all the eigenvalues you can specify only the desired ones by using subset_by_index:

from scipy.linalg import eigh

eigvals, eigvecs = eigh(A, B, eigvals_only=False, subset_by_index=[0, 1, 2])

One could use eigvals_only=True to obtain only the eigenvalues.

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  • Thanks for clearing this up! That example in the docs for this function was pretty unclear at first glance. Jul 16, 2014 at 2:54
  • This is reassuring for my purposes, @Saullo, but I'm having problems. By my reckoning, eigh is a specialisation of eig. However, if I use eigh and eig with the same inputs I get completely different answers. Is there an additional distinction? Jun 30, 2020 at 16:25
  • @MikeSadler, are you using symmetric matrices as input? Jul 1, 2020 at 23:09
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    @SaulloG.P.Castro, I am - I was checking them in my test case that they were both symmetric and positive definite. I've side-stepped the problem now, but could it be that eig and eigh don necessarily return the results in the same order? Jul 3, 2020 at 10:27
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    @MikeSadler Indeed. According to the documentation, numpy.linalg.eigh returns "the eigenvalues in ascending order, each repeated according to its multiplicity." There is no predefined eigenvalue order with numpy.linalg.eig
    – EA304GT
    Dec 29, 2021 at 23:06
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Have you seen scipy.linalg.eig? From the documentation:

Solve an ordinary or generalized eigenvalue problem of a square matrix.

This method have optional parameter b:

scipy.linalg.eig(a, b=None, ...
b : (M, M) array_like, optional
Right-hand side matrix in a generalized eigenvalue problem. 
          Default is None, identity matrix is assumed.
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  • The problem in OP is Aw = xBw.
    – emesday
    Jul 15, 2014 at 7:54
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    so, what's the problem? scipy.linalg.eig(a, b=None,...: parameter b: Right-hand side matrix in a generalized eigenvalue problem. Default is None, identity matrix is assumed. Jul 15, 2014 at 7:56

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